"""
The ``pvsystem`` module contains functions for modeling the output and
performance of PV modules and inverters.
"""
from __future__ import division
from collections import OrderedDict
import io
import os
try:
from urllib2 import urlopen
except ImportError:
from urllib.request import urlopen
import numpy as np
import pandas as pd
from pvlib import atmosphere, irradiance, tools, singlediode as _singlediode
from pvlib.tools import _build_kwargs
from pvlib.location import Location
# a dict of required parameter names for each DC power model
DC_MODEL_PARAMS = {
'sapm' : set([
'A0', 'A1', 'A2', 'A3', 'A4', 'B0', 'B1', 'B2', 'B3',
'B4', 'B5', 'C0', 'C1', 'C2', 'C3', 'C4', 'C5', 'C6',
'C7', 'Isco', 'Impo', 'Aisc', 'Aimp', 'Bvoco',
'Mbvoc', 'Bvmpo', 'Mbvmp', 'N', 'Cells_in_Series',
'IXO', 'IXXO', 'FD']),
'desoto' : set([
'alpha_sc', 'a_ref', 'I_L_ref', 'I_o_ref',
'R_sh_ref', 'R_s']),
'pvsyst' : set([
'gamma_ref', 'mu_gamma', 'I_L_ref', 'I_o_ref',
'R_sh_ref', 'R_sh_0', 'R_s', 'alpha_sc', 'EgRef',
'cells_in_series']),
'singlediode' : set([
'alpha_sc', 'a_ref', 'I_L_ref', 'I_o_ref',
'R_sh_ref', 'R_s']),
'pvwatts' : set(['pdc0', 'gamma_pdc'])
}
# not sure if this belongs in the pvsystem module.
# maybe something more like core.py? It may eventually grow to
# import a lot more functionality from other modules.
[docs]class PVSystem(object):
"""
The PVSystem class defines a standard set of PV system attributes
and modeling functions. This class describes the collection and
interactions of PV system components rather than an installed system
on the ground. It is typically used in combination with
:py:class:`~pvlib.location.Location` and
:py:class:`~pvlib.modelchain.ModelChain`
objects.
See the :py:class:`LocalizedPVSystem` class for an object model that
describes an installed PV system.
The class supports basic system topologies consisting of:
* `N` total modules arranged in series
(`modules_per_string=N`, `strings_per_inverter=1`).
* `M` total modules arranged in parallel
(`modules_per_string=1`, `strings_per_inverter=M`).
* `NxM` total modules arranged in `M` strings of `N` modules each
(`modules_per_string=N`, `strings_per_inverter=M`).
The class is complementary to the module-level functions.
The attributes should generally be things that don't change about
the system, such the type of module and the inverter. The instance
methods accept arguments for things that do change, such as
irradiance and temperature.
Parameters
----------
surface_tilt: float or array-like, default 0
Surface tilt angles in decimal degrees.
The tilt angle is defined as degrees from horizontal
(e.g. surface facing up = 0, surface facing horizon = 90)
surface_azimuth: float or array-like, default 180
Azimuth angle of the module surface.
North=0, East=90, South=180, West=270.
albedo : None or float, default None
The ground albedo. If ``None``, will attempt to use
``surface_type`` and ``irradiance.SURFACE_ALBEDOS``
to lookup albedo.
surface_type : None or string, default None
The ground surface type. See ``irradiance.SURFACE_ALBEDOS``
for valid values.
module : None or string, default None
The model name of the modules.
May be used to look up the module_parameters dictionary
via some other method.
module_parameters : None, dict or Series, default None
Module parameters as defined by the SAPM, CEC, or other.
modules_per_string: int or float, default 1
See system topology discussion above.
strings_per_inverter: int or float, default 1
See system topology discussion above.
inverter : None or string, default None
The model name of the inverters.
May be used to look up the inverter_parameters dictionary
via some other method.
inverter_parameters : None, dict or Series, default None
Inverter parameters as defined by the SAPM, CEC, or other.
racking_model : None or string, default 'open_rack_cell_glassback'
Used for cell and module temperature calculations.
losses_parameters : None, dict or Series, default None
Losses parameters as defined by PVWatts or other.
name : None or string, default None
**kwargs
Arbitrary keyword arguments.
Included for compatibility, but not used.
See also
--------
pvlib.location.Location
pvlib.tracking.SingleAxisTracker
pvlib.pvsystem.LocalizedPVSystem
"""
[docs] def __init__(self,
surface_tilt=0, surface_azimuth=180,
albedo=None, surface_type=None,
module=None, module_parameters=None,
modules_per_string=1, strings_per_inverter=1,
inverter=None, inverter_parameters=None,
racking_model='open_rack_cell_glassback',
losses_parameters=None, name=None, **kwargs):
self.name = name
self.surface_tilt = surface_tilt
self.surface_azimuth = surface_azimuth
# could tie these together with @property
self.surface_type = surface_type
if albedo is None:
self.albedo = irradiance.SURFACE_ALBEDOS.get(surface_type, 0.25)
else:
self.albedo = albedo
# could tie these together with @property
self.module = module
if module_parameters is None:
self.module_parameters = {}
else:
self.module_parameters = module_parameters
self.modules_per_string = modules_per_string
self.strings_per_inverter = strings_per_inverter
self.inverter = inverter
if inverter_parameters is None:
self.inverter_parameters = {}
else:
self.inverter_parameters = inverter_parameters
if losses_parameters is None:
self.losses_parameters = {}
else:
self.losses_parameters = losses_parameters
self.racking_model = racking_model
def __repr__(self):
attrs = ['name', 'surface_tilt', 'surface_azimuth', 'module',
'inverter', 'albedo', 'racking_model']
return ('PVSystem: \n ' + '\n '.join(
('{}: {}'.format(attr, getattr(self, attr)) for attr in attrs)))
[docs] def get_aoi(self, solar_zenith, solar_azimuth):
"""Get the angle of incidence on the system.
Parameters
----------
solar_zenith : float or Series.
Solar zenith angle.
solar_azimuth : float or Series.
Solar azimuth angle.
Returns
-------
aoi : Series
The angle of incidence
"""
aoi = irradiance.aoi(self.surface_tilt, self.surface_azimuth,
solar_zenith, solar_azimuth)
return aoi
[docs] def get_irradiance(self, solar_zenith, solar_azimuth, dni, ghi, dhi,
dni_extra=None, airmass=None, model='haydavies',
**kwargs):
"""
Uses the :py:func:`irradiance.get_total_irradiance` function to
calculate the plane of array irradiance components on a tilted
surface defined by ``self.surface_tilt``,
``self.surface_azimuth``, and ``self.albedo``.
Parameters
----------
solar_zenith : float or Series.
Solar zenith angle.
solar_azimuth : float or Series.
Solar azimuth angle.
dni : float or Series
Direct Normal Irradiance
ghi : float or Series
Global horizontal irradiance
dhi : float or Series
Diffuse horizontal irradiance
dni_extra : None, float or Series, default None
Extraterrestrial direct normal irradiance
airmass : None, float or Series, default None
Airmass
model : String, default 'haydavies'
Irradiance model.
**kwargs
Passed to :func:`irradiance.total_irrad`.
Returns
-------
poa_irradiance : DataFrame
Column names are: ``total, beam, sky, ground``.
"""
# not needed for all models, but this is easier
if dni_extra is None:
dni_extra = irradiance.get_extra_radiation(solar_zenith.index)
if airmass is None:
airmass = atmosphere.get_relative_airmass(solar_zenith)
return irradiance.get_total_irradiance(self.surface_tilt,
self.surface_azimuth,
solar_zenith, solar_azimuth,
dni, ghi, dhi,
dni_extra=dni_extra,
airmass=airmass,
model=model,
albedo=self.albedo,
**kwargs)
def ashraeiam(self, aoi):
"""
Determine the incidence angle modifier using
``self.module_parameters['b']``, ``aoi``,
and the :py:func:`ashraeiam` function.
Uses default arguments if keys not in module_parameters.
Parameters
----------
aoi : numeric
The angle of incidence in degrees.
Returns
-------
modifier : numeric
The AOI modifier.
"""
kwargs = _build_kwargs(['b'], self.module_parameters)
return ashraeiam(aoi, **kwargs)
def physicaliam(self, aoi):
"""
Determine the incidence angle modifier using ``aoi``,
``self.module_parameters['K']``,
``self.module_parameters['L']``,
``self.module_parameters['n']``,
and the
:py:func:`physicaliam` function.
Uses default arguments if keys not in module_parameters.
Parameters
----------
aoi : numeric
The angle of incidence in degrees.
Returns
-------
modifier : numeric
The AOI modifier.
"""
kwargs = _build_kwargs(['K', 'L', 'n'], self.module_parameters)
return physicaliam(aoi, **kwargs)
def calcparams_desoto(self, effective_irradiance, temp_cell, **kwargs):
"""
Use the :py:func:`calcparams_desoto` function, the input
parameters and ``self.module_parameters`` to calculate the
module currents and resistances.
Parameters
----------
effective_irradiance : numeric
The irradiance (W/m2) that is converted to photocurrent.
temp_cell : float or Series
The average cell temperature of cells within a module in C.
**kwargs
See pvsystem.calcparams_desoto for details
Returns
-------
See pvsystem.calcparams_desoto for details
"""
kwargs = _build_kwargs(['a_ref', 'I_L_ref', 'I_o_ref', 'R_sh_ref',
'R_s', 'alpha_sc', 'EgRef', 'dEgdT',
'irrad_ref', 'temp_ref'],
self.module_parameters)
return calcparams_desoto(effective_irradiance, temp_cell, **kwargs)
def calcparams_pvsyst(self, effective_irradiance, temp_cell):
"""
Use the :py:func:`calcparams_pvsyst` function, the input
parameters and ``self.module_parameters`` to calculate the
module currents and resistances.
Parameters
----------
effective_irradiance : numeric
The irradiance (W/m2) that is converted to photocurrent.
temp_cell : float or Series
The average cell temperature of cells within a module in C.
Returns
-------
See pvsystem.calcparams_pvsyst for details
"""
kwargs = _build_kwargs(['gamma_ref', 'mu_gamma', 'I_L_ref', 'I_o_ref',
'R_sh_ref', 'R_sh_0', 'R_sh_exp',
'R_s', 'alpha_sc', 'EgRef',
'irrad_ref', 'temp_ref',
'cells_in_series'],
self.module_parameters)
return calcparams_pvsyst(effective_irradiance, temp_cell, **kwargs)
def sapm(self, effective_irradiance, temp_cell, **kwargs):
"""
Use the :py:func:`sapm` function, the input parameters,
and ``self.module_parameters`` to calculate
Voc, Isc, Ix, Ixx, Vmp/Imp.
Parameters
----------
poa_direct : Series
The direct irradiance incident upon the module (W/m^2).
poa_diffuse : Series
The diffuse irradiance incident on module.
temp_cell : Series
The cell temperature (degrees C).
airmass_absolute : Series
Absolute airmass.
aoi : Series
Angle of incidence (degrees).
**kwargs
See pvsystem.sapm for details
Returns
-------
See pvsystem.sapm for details
"""
return sapm(effective_irradiance, temp_cell, self.module_parameters)
def sapm_celltemp(self, irrad, wind, temp):
"""Uses :py:func:`sapm_celltemp` to calculate module and cell
temperatures based on ``self.racking_model`` and
the input parameters.
Parameters
----------
See pvsystem.sapm_celltemp for details
Returns
-------
See pvsystem.sapm_celltemp for details
"""
return sapm_celltemp(irrad, wind, temp, self.racking_model)
def sapm_spectral_loss(self, airmass_absolute):
"""
Use the :py:func:`sapm_spectral_loss` function, the input
parameters, and ``self.module_parameters`` to calculate F1.
Parameters
----------
airmass_absolute : numeric
Absolute airmass.
Returns
-------
F1 : numeric
The SAPM spectral loss coefficient.
"""
return sapm_spectral_loss(airmass_absolute, self.module_parameters)
def sapm_aoi_loss(self, aoi):
"""
Use the :py:func:`sapm_aoi_loss` function, the input parameters,
and ``self.module_parameters`` to calculate F2.
Parameters
----------
aoi : numeric
Angle of incidence in degrees.
Returns
-------
F2 : numeric
The SAPM angle of incidence loss coefficient.
"""
return sapm_aoi_loss(aoi, self.module_parameters)
def sapm_effective_irradiance(self, poa_direct, poa_diffuse,
airmass_absolute, aoi,
reference_irradiance=1000):
"""
Use the :py:func:`sapm_effective_irradiance` function, the input
parameters, and ``self.module_parameters`` to calculate
effective irradiance.
Parameters
----------
poa_direct : numeric
The direct irradiance incident upon the module.
poa_diffuse : numeric
The diffuse irradiance incident on module.
airmass_absolute : numeric
Absolute airmass.
aoi : numeric
Angle of incidence in degrees.
reference_irradiance : numeric, default 1000
Reference irradiance by which to divide the input irradiance.
Returns
-------
effective_irradiance : numeric
The SAPM effective irradiance.
"""
return sapm_effective_irradiance(
poa_direct, poa_diffuse, airmass_absolute, aoi,
self.module_parameters, reference_irradiance=reference_irradiance)
def first_solar_spectral_loss(self, pw, airmass_absolute):
"""
Use the :py:func:`first_solar_spectral_correction` function to
calculate the spectral loss modifier. The model coefficients are
specific to the module's cell type, and are determined by searching
for one of the following keys in self.module_parameters (in order):
'first_solar_spectral_coefficients' (user-supplied coefficients)
'Technology' - a string describing the cell type, can be read from
the CEC module parameter database
'Material' - a string describing the cell type, can be read from
the Sandia module database.
Parameters
----------
pw : array-like
atmospheric precipitable water (cm).
airmass_absolute : array-like
absolute (pressure corrected) airmass.
Returns
-------
modifier: array-like
spectral mismatch factor (unitless) which can be multiplied
with broadband irradiance reaching a module's cells to estimate
effective irradiance, i.e., the irradiance that is converted to
electrical current.
"""
if 'first_solar_spectral_coefficients' in \
self.module_parameters.keys():
coefficients = \
self.module_parameters['first_solar_spectral_coefficients']
module_type = None
else:
module_type = self._infer_cell_type()
coefficients = None
return atmosphere.first_solar_spectral_correction(pw,
airmass_absolute,
module_type,
coefficients)
def _infer_cell_type(self):
"""
Examines module_parameters and maps the Technology key for the CEC
database and the Material key for the Sandia database to a common
list of strings for cell type.
Returns
-------
cell_type: str
"""
_cell_type_dict = {'Multi-c-Si': 'multisi',
'Mono-c-Si': 'monosi',
'Thin Film': 'cigs',
'a-Si/nc': 'asi',
'CIS': 'cigs',
'CIGS': 'cigs',
'1-a-Si': 'asi',
'CdTe': 'cdte',
'a-Si': 'asi',
'2-a-Si': None,
'3-a-Si': None,
'HIT-Si': 'monosi',
'mc-Si': 'multisi',
'c-Si': 'multisi',
'Si-Film': 'asi',
'EFG mc-Si': 'multisi',
'GaAs': None,
'a-Si / mono-Si': 'monosi'}
if 'Technology' in self.module_parameters.keys():
# CEC module parameter set
cell_type = _cell_type_dict[self.module_parameters['Technology']]
elif 'Material' in self.module_parameters.keys():
# Sandia module parameter set
cell_type = _cell_type_dict[self.module_parameters['Material']]
else:
cell_type = None
return cell_type
def singlediode(self, photocurrent, saturation_current,
resistance_series, resistance_shunt, nNsVth,
ivcurve_pnts=None):
"""Wrapper around the :py:func:`singlediode` function.
Parameters
----------
See pvsystem.singlediode for details
Returns
-------
See pvsystem.singlediode for details
"""
return singlediode(photocurrent, saturation_current,
resistance_series, resistance_shunt, nNsVth,
ivcurve_pnts=ivcurve_pnts)
def i_from_v(self, resistance_shunt, resistance_series, nNsVth, voltage,
saturation_current, photocurrent):
"""Wrapper around the :py:func:`i_from_v` function.
Parameters
----------
See pvsystem.i_from_v for details
Returns
-------
See pvsystem.i_from_v for details
"""
return i_from_v(resistance_shunt, resistance_series, nNsVth, voltage,
saturation_current, photocurrent)
# inverter now specified by self.inverter_parameters
def snlinverter(self, v_dc, p_dc):
"""Uses :func:`snlinverter` to calculate AC power based on
``self.inverter_parameters`` and the input parameters.
Parameters
----------
See pvsystem.snlinverter for details
Returns
-------
See pvsystem.snlinverter for details
"""
return snlinverter(v_dc, p_dc, self.inverter_parameters)
def adrinverter(self, v_dc, p_dc):
return adrinverter(v_dc, p_dc, self.inverter_parameters)
def scale_voltage_current_power(self, data):
"""
Scales the voltage, current, and power of the DataFrames
returned by :py:func:`singlediode` and :py:func:`sapm`
by `self.modules_per_string` and `self.strings_per_inverter`.
Parameters
----------
data: DataFrame
Must contain columns `'v_mp', 'v_oc', 'i_mp' ,'i_x', 'i_xx',
'i_sc', 'p_mp'`.
Returns
-------
scaled_data: DataFrame
A scaled copy of the input data.
"""
return scale_voltage_current_power(data,
voltage=self.modules_per_string,
current=self.strings_per_inverter)
def pvwatts_dc(self, g_poa_effective, temp_cell):
"""
Calcuates DC power according to the PVWatts model using
:py:func:`pvwatts_dc`, `self.module_parameters['pdc0']`, and
`self.module_parameters['gamma_pdc']`.
See :py:func:`pvwatts_dc` for details.
"""
kwargs = _build_kwargs(['temp_ref'], self.module_parameters)
return pvwatts_dc(g_poa_effective, temp_cell,
self.module_parameters['pdc0'],
self.module_parameters['gamma_pdc'],
**kwargs)
def pvwatts_losses(self):
"""
Calculates DC power losses according the PVwatts model using
:py:func:`pvwatts_losses` and ``self.losses_parameters``.`
See :py:func:`pvwatts_losses` for details.
"""
kwargs = _build_kwargs(['soiling', 'shading', 'snow', 'mismatch',
'wiring', 'connections', 'lid',
'nameplate_rating', 'age', 'availability'],
self.losses_parameters)
return pvwatts_losses(**kwargs)
def pvwatts_ac(self, pdc):
"""
Calculates AC power according to the PVWatts model using
:py:func:`pvwatts_ac`, `self.module_parameters['pdc0']`, and
`eta_inv_nom=self.inverter_parameters['eta_inv_nom']`.
See :py:func:`pvwatts_ac` for details.
"""
kwargs = _build_kwargs(['eta_inv_nom', 'eta_inv_ref'],
self.inverter_parameters)
return pvwatts_ac(pdc, self.module_parameters['pdc0'], **kwargs)
def localize(self, location=None, latitude=None, longitude=None,
**kwargs):
"""Creates a LocalizedPVSystem object using this object
and location data. Must supply either location object or
latitude, longitude, and any location kwargs
Parameters
----------
location : None or Location, default None
latitude : None or float, default None
longitude : None or float, default None
**kwargs : see Location
Returns
-------
localized_system : LocalizedPVSystem
"""
if location is None:
location = Location(latitude, longitude, **kwargs)
return LocalizedPVSystem(pvsystem=self, location=location)
[docs]class LocalizedPVSystem(PVSystem, Location):
"""
The LocalizedPVSystem class defines a standard set of installed PV
system attributes and modeling functions. This class combines the
attributes and methods of the PVSystem and Location classes.
The LocalizedPVSystem may have bugs due to the difficulty of
robustly implementing multiple inheritance. See
:py:class:`~pvlib.modelchain.ModelChain` for an alternative paradigm
for modeling PV systems at specific locations.
"""
[docs] def __init__(self, pvsystem=None, location=None, **kwargs):
# get and combine attributes from the pvsystem and/or location
# with the rest of the kwargs
if pvsystem is not None:
pv_dict = pvsystem.__dict__
else:
pv_dict = {}
if location is not None:
loc_dict = location.__dict__
else:
loc_dict = {}
new_kwargs = dict(list(pv_dict.items()) +
list(loc_dict.items()) +
list(kwargs.items()))
PVSystem.__init__(self, **new_kwargs)
Location.__init__(self, **new_kwargs)
def __repr__(self):
attrs = ['name', 'latitude', 'longitude', 'altitude', 'tz',
'surface_tilt', 'surface_azimuth', 'module', 'inverter',
'albedo', 'racking_model']
return ('LocalizedPVSystem: \n ' + '\n '.join(
('{}: {}'.format(attr, getattr(self, attr)) for attr in attrs)))
[docs]def systemdef(meta, surface_tilt, surface_azimuth, albedo, modules_per_string,
strings_per_inverter):
'''
Generates a dict of system parameters used throughout a simulation.
Parameters
----------
meta : dict
meta dict either generated from a TMY file using readtmy2 or
readtmy3, or a dict containing at least the following fields:
=============== ====== ====================
meta field format description
=============== ====== ====================
meta.altitude Float site elevation
meta.latitude Float site latitude
meta.longitude Float site longitude
meta.Name String site name
meta.State String state
meta.TZ Float timezone
=============== ====== ====================
surface_tilt : float or Series
Surface tilt angles in decimal degrees.
The tilt angle is defined as degrees from horizontal
(e.g. surface facing up = 0, surface facing horizon = 90)
surface_azimuth : float or Series
Surface azimuth angles in decimal degrees.
The azimuth convention is defined
as degrees east of north
(North=0, South=180, East=90, West=270).
albedo : float or Series
Ground reflectance, typically 0.1-0.4 for surfaces on Earth
(land), may increase over snow, ice, etc. May also be known as
the reflection coefficient. Must be >=0 and <=1.
modules_per_string : int
Number of modules connected in series in a string.
strings_per_inverter : int
Number of strings connected in parallel.
Returns
-------
Result : dict
A dict with the following fields.
* 'surface_tilt'
* 'surface_azimuth'
* 'albedo'
* 'modules_per_string'
* 'strings_per_inverter'
* 'latitude'
* 'longitude'
* 'tz'
* 'name'
* 'altitude'
See also
--------
pvlib.tmy.readtmy3
pvlib.tmy.readtmy2
'''
try:
name = meta['Name']
except KeyError:
name = meta['City']
system = {'surface_tilt': surface_tilt,
'surface_azimuth': surface_azimuth,
'albedo': albedo,
'modules_per_string': modules_per_string,
'strings_per_inverter': strings_per_inverter,
'latitude': meta['latitude'],
'longitude': meta['longitude'],
'tz': meta['TZ'],
'name': name,
'altitude': meta['altitude']}
return system
[docs]def ashraeiam(aoi, b=0.05):
'''
Determine the incidence angle modifier using the ASHRAE transmission
model.
ashraeiam calculates the incidence angle modifier as developed in
[1], and adopted by ASHRAE (American Society of Heating,
Refrigeration, and Air Conditioning Engineers) [2]. The model has
been used by model programs such as PVSyst [3].
Note: For incident angles near 90 degrees, this model has a
discontinuity which has been addressed in this function.
Parameters
----------
aoi : numeric
The angle of incidence between the module normal vector and the
sun-beam vector in degrees. Angles of nan will result in nan.
b : float, default 0.05
A parameter to adjust the modifier as a function of angle of
incidence. Typical values are on the order of 0.05 [3].
Returns
-------
IAM : numeric
The incident angle modifier calculated as 1-b*(sec(aoi)-1) as
described in [2,3].
Returns zeros for all abs(aoi) >= 90 and for all IAM values that
would be less than 0.
References
----------
[1] Souka A.F., Safwat H.H., "Determination of the optimum
orientations for the double exposure flat-plate collector and its
reflections". Solar Energy vol .10, pp 170-174. 1966.
[2] ASHRAE standard 93-77
[3] PVsyst Contextual Help.
http://files.pvsyst.com/help/index.html?iam_loss.htm retrieved on
September 10, 2012
See Also
--------
irradiance.aoi
physicaliam
'''
iam = 1 - b * ((1 / np.cos(np.radians(aoi)) - 1))
aoi_gte_90 = np.full_like(aoi, False, dtype='bool')
np.greater_equal(np.abs(aoi), 90, where=~np.isnan(aoi), out=aoi_gte_90)
iam = np.where(aoi_gte_90, 0, iam)
iam = np.maximum(0, iam)
if isinstance(iam, pd.Series):
iam = pd.Series(iam, index=aoi.index)
return iam
[docs]def physicaliam(aoi, n=1.526, K=4., L=0.002):
'''
Determine the incidence angle modifier using refractive index,
extinction coefficient, and glazing thickness.
physicaliam calculates the incidence angle modifier as described in
De Soto et al. "Improvement and validation of a model for
photovoltaic array performance", section 3. The calculation is based
on a physical model of absorbtion and transmission through a
cover.
Note: The authors of this function believe that eqn. 14 in [1] is
incorrect. This function uses the following equation in its place:
theta_r = arcsin(1/n * sin(aoi))
Parameters
----------
aoi : numeric
The angle of incidence between the module normal vector and the
sun-beam vector in degrees. Angles of 0 are replaced with 1e-06
to ensure non-nan results. Angles of nan will result in nan.
n : numeric, default 1.526
The effective index of refraction (unitless). Reference [1]
indicates that a value of 1.526 is acceptable for glass. n must
be a numeric scalar or vector with all values >=0. If n is a
vector, it must be the same size as all other input vectors.
K : numeric, default 4.0
The glazing extinction coefficient in units of 1/meters.
Reference [1] indicates that a value of 4 is reasonable for
"water white" glass. K must be a numeric scalar or vector with
all values >=0. If K is a vector, it must be the same size as
all other input vectors.
L : numeric, default 0.002
The glazing thickness in units of meters. Reference [1]
indicates that 0.002 meters (2 mm) is reasonable for most
glass-covered PV panels. L must be a numeric scalar or vector
with all values >=0. If L is a vector, it must be the same size
as all other input vectors.
Returns
-------
iam : numeric
The incident angle modifier
References
----------
[1] W. De Soto et al., "Improvement and validation of a model for
photovoltaic array performance", Solar Energy, vol 80, pp. 78-88,
2006.
[2] Duffie, John A. & Beckman, William A.. (2006). Solar Engineering
of Thermal Processes, third edition. [Books24x7 version] Available
from http://common.books24x7.com/toc.aspx?bookid=17160.
See Also
--------
getaoi
ephemeris
spa
ashraeiam
'''
zeroang = 1e-06
# hold a new reference to the input aoi object since we're going to
# overwrite the aoi reference below, but we'll need it for the
# series check at the end of the function
aoi_input = aoi
aoi = np.where(aoi == 0, zeroang, aoi)
# angle of reflection
thetar_deg = tools.asind(1.0 / n*(tools.sind(aoi)))
# reflectance and transmittance for normal incidence light
rho_zero = ((1-n) / (1+n)) ** 2
tau_zero = np.exp(-K*L)
# reflectance for parallel and perpendicular polarized light
rho_para = (tools.tand(thetar_deg - aoi) /
tools.tand(thetar_deg + aoi)) ** 2
rho_perp = (tools.sind(thetar_deg - aoi) /
tools.sind(thetar_deg + aoi)) ** 2
# transmittance for non-normal light
tau = np.exp(-K*L / tools.cosd(thetar_deg))
# iam is ratio of non-normal to normal incidence transmitted light
# after deducting the reflected portion of each
iam = ((1 - (rho_para + rho_perp) / 2) / (1 - rho_zero) * tau / tau_zero)
with np.errstate(invalid='ignore'):
# angles near zero produce nan, but iam is defined as one
small_angle = 1e-06
iam = np.where(np.abs(aoi) < small_angle, 1.0, iam)
# angles at 90 degrees can produce tiny negative values,
# which should be zero. this is a result of calculation precision
# rather than the physical model
iam = np.where(iam < 0, 0, iam)
# for light coming from behind the plane, none can enter the module
iam = np.where(aoi > 90, 0, iam)
if isinstance(aoi_input, pd.Series):
iam = pd.Series(iam, index=aoi_input.index)
return iam
[docs]def calcparams_desoto(effective_irradiance, temp_cell,
alpha_sc, a_ref, I_L_ref, I_o_ref, R_sh_ref, R_s,
EgRef=1.121, dEgdT=-0.0002677,
irrad_ref=1000, temp_ref=25):
'''
Calculates five parameter values for the single diode equation at
effective irradiance and cell temperature using the De Soto et al.
model described in [1]. The five values returned by calcparams_desoto
can be used by singlediode to calculate an IV curve.
Parameters
----------
effective_irradiance : numeric
The irradiance (W/m2) that is converted to photocurrent.
temp_cell : numeric
The average cell temperature of cells within a module in C.
alpha_sc : float
The short-circuit current temperature coefficient of the
module in units of A/C.
a_ref : float
The product of the usual diode ideality factor (n, unitless),
number of cells in series (Ns), and cell thermal voltage at reference
conditions, in units of V.
I_L_ref : float
The light-generated current (or photocurrent) at reference conditions,
in amperes.
I_o_ref : float
The dark or diode reverse saturation current at reference conditions,
in amperes.
R_sh_ref : float
The shunt resistance at reference conditions, in ohms.
R_s : float
The series resistance at reference conditions, in ohms.
EgRef : float
The energy bandgap at reference temperature in units of eV.
1.121 eV for crystalline silicon. EgRef must be >0. For parameters
from the SAM CEC module database, EgRef=1.121 is implicit for all
cell types in the parameter estimation algorithm used by NREL.
dEgdT : float
The temperature dependence of the energy bandgap at reference
conditions in units of 1/K. May be either a scalar value
(e.g. -0.0002677 as in [1]) or a DataFrame (this may be useful if
dEgdT is a modeled as a function of temperature). For parameters from
the SAM CEC module database, dEgdT=-0.0002677 is implicit for all cell
types in the parameter estimation algorithm used by NREL.
irrad_ref : float (optional, default=1000)
Reference irradiance in W/m^2.
temp_ref : float (optional, default=25)
Reference cell temperature in C.
Returns
-------
Tuple of the following results:
photocurrent : numeric
Light-generated current in amperes
saturation_current : numeric
Diode saturation curent in amperes
resistance_series : float
Series resistance in ohms
resistance_shunt : numeric
Shunt resistance in ohms
nNsVth : numeric
The product of the usual diode ideality factor (n, unitless),
number of cells in series (Ns), and cell thermal voltage at
specified effective irradiance and cell temperature.
References
----------
[1] W. De Soto et al., "Improvement and validation of a model for
photovoltaic array performance", Solar Energy, vol 80, pp. 78-88,
2006.
[2] System Advisor Model web page. https://sam.nrel.gov.
[3] A. Dobos, "An Improved Coefficient Calculator for the California
Energy Commission 6 Parameter Photovoltaic Module Model", Journal of
Solar Energy Engineering, vol 134, 2012.
[4] O. Madelung, "Semiconductors: Data Handbook, 3rd ed." ISBN
3-540-40488-0
See Also
--------
singlediode
retrieve_sam
Notes
-----
If the reference parameters in the ModuleParameters struct are read
from a database or library of parameters (e.g. System Advisor
Model), it is important to use the same EgRef and dEgdT values that
were used to generate the reference parameters, regardless of the
actual bandgap characteristics of the semiconductor. For example, in
the case of the System Advisor Model library, created as described
in [3], EgRef and dEgdT for all modules were 1.121 and -0.0002677,
respectively.
This table of reference bandgap energies (EgRef), bandgap energy
temperature dependence (dEgdT), and "typical" airmass response (M)
is provided purely as reference to those who may generate their own
reference module parameters (a_ref, IL_ref, I0_ref, etc.) based upon
the various PV semiconductors. Again, we stress the importance of
using identical EgRef and dEgdT when generation reference parameters
and modifying the reference parameters (for irradiance, temperature,
and airmass) per DeSoto's equations.
Crystalline Silicon (Si):
* EgRef = 1.121
* dEgdT = -0.0002677
>>> M = np.polyval([-1.26E-4, 2.816E-3, -0.024459, 0.086257, 0.9181],
... AMa) # doctest: +SKIP
Source: [1]
Cadmium Telluride (CdTe):
* EgRef = 1.475
* dEgdT = -0.0003
>>> M = np.polyval([-2.46E-5, 9.607E-4, -0.0134, 0.0716, 0.9196],
... AMa) # doctest: +SKIP
Source: [4]
Copper Indium diSelenide (CIS):
* EgRef = 1.010
* dEgdT = -0.00011
>>> M = np.polyval([-3.74E-5, 0.00125, -0.01462, 0.0718, 0.9210],
... AMa) # doctest: +SKIP
Source: [4]
Copper Indium Gallium diSelenide (CIGS):
* EgRef = 1.15
* dEgdT = ????
>>> M = np.polyval([-9.07E-5, 0.0022, -0.0202, 0.0652, 0.9417],
... AMa) # doctest: +SKIP
Source: Wikipedia
Gallium Arsenide (GaAs):
* EgRef = 1.424
* dEgdT = -0.000433
* M = unknown
Source: [4]
'''
# test for use of function pre-v0.6.0 API change
if isinstance(a_ref, dict) or \
(isinstance(a_ref, pd.Series) and ('a_ref' in a_ref.keys())):
import warnings
warnings.warn('module_parameters detected as fourth positional'
+ ' argument of calcparams_desoto. calcparams_desoto'
+ ' will require one argument for each module model'
+ ' parameter in v0.7.0 and later', DeprecationWarning)
try:
module_parameters = a_ref
a_ref = module_parameters['a_ref']
I_L_ref = module_parameters['I_L_ref']
I_o_ref = module_parameters['I_o_ref']
R_sh_ref = module_parameters['R_sh_ref']
R_s = module_parameters['R_s']
except Exception as e:
raise e('Module parameters could not be extracted from fourth'
+ ' positional argument of calcparams_desoto. Check that'
+ ' parameters are from the CEC database and/or update'
+ ' your code for the new API for calcparams_desoto')
# Boltzmann constant in eV/K
k = 8.617332478e-05
# reference temperature
Tref_K = temp_ref + 273.15
Tcell_K = temp_cell + 273.15
E_g = EgRef * (1 + dEgdT*(Tcell_K - Tref_K))
nNsVth = a_ref * (Tcell_K / Tref_K)
# In the equation for IL, the single factor effective_irradiance is
# used, in place of the product S*M in [1]. effective_irradiance is
# equivalent to the product of S (irradiance reaching a module's cells) *
# M (spectral adjustment factor) as described in [1].
IL = effective_irradiance / irrad_ref * \
(I_L_ref + alpha_sc * (Tcell_K - Tref_K))
I0 = (I_o_ref * ((Tcell_K / Tref_K) ** 3) *
(np.exp(EgRef / (k*(Tref_K)) - (E_g / (k*(Tcell_K))))))
# Note that the equation for Rsh differs from [1]. In [1] Rsh is given as
# Rsh = Rsh_ref * (S_ref / S) where S is broadband irradiance reaching
# the module's cells. If desired this model behavior can be duplicated
# by applying reflection and soiling losses to broadband plane of array
# irradiance and not applying a spectral loss modifier, i.e.,
# spectral_modifier = 1.0.
Rsh = R_sh_ref * (irrad_ref / effective_irradiance)
Rs = R_s
return IL, I0, Rs, Rsh, nNsVth
[docs]def calcparams_pvsyst(effective_irradiance, temp_cell,
alpha_sc, gamma_ref, mu_gamma,
I_L_ref, I_o_ref,
R_sh_ref, R_sh_0, R_s,
cells_in_series,
R_sh_exp=5.5,
EgRef=1.121,
irrad_ref=1000, temp_ref=25):
'''
Calculates five parameter values for the single diode equation at
effective irradiance and cell temperature using the PVsyst v6
model described in [1,2,3]. The five values returned by calcparams_pvsyst
can be used by singlediode to calculate an IV curve.
Parameters
----------
effective_irradiance : numeric
The irradiance (W/m2) that is converted to photocurrent.
temp_cell : numeric
The average cell temperature of cells within a module in C.
alpha_sc : float
The short-circuit current temperature coefficient of the
module in units of A/C.
gamma_ref : float
The diode ideality factor
mu_gamma : float
The temperature coefficient for the diode ideality factor, 1/K
I_L_ref : float
The light-generated current (or photocurrent) at reference conditions,
in amperes.
I_o_ref : float
The dark or diode reverse saturation current at reference conditions,
in amperes.
R_sh_ref : float
The shunt resistance at reference conditions, in ohms.
R_sh_0 : float
The shunt resistance at zero irradiance conditions, in ohms.
R_s : float
The series resistance at reference conditions, in ohms.
cells_in_series : integer
The number of cells connected in series.
R_sh_exp : float
The exponent in the equation for shunt resistance, unitless. Defaults
to 5.5.
EgRef : float
The energy bandgap at reference temperature in units of eV.
1.121 eV for crystalline silicon. EgRef must be >0.
irrad_ref : float (optional, default=1000)
Reference irradiance in W/m^2.
temp_ref : float (optional, default=25)
Reference cell temperature in C.
Returns
-------
Tuple of the following results:
photocurrent : numeric
Light-generated current in amperes
saturation_current : numeric
Diode saturation current in amperes
resistance_series : float
Series resistance in ohms
resistance_shunt : numeric
Shunt resistance in ohms
nNsVth : numeric
The product of the usual diode ideality factor (n, unitless),
number of cells in series (Ns), and cell thermal voltage at
specified effective irradiance and cell temperature.
References
----------
[1] K. Sauer, T. Roessler, C. W. Hansen, Modeling the Irradiance and
Temperature Dependence of Photovoltaic Modules in PVsyst,
IEEE Journal of Photovoltaics v5(1), January 2015.
[2] A. Mermoud, PV modules modelling, Presentation at the 2nd PV
Performance Modeling Workshop, Santa Clara, CA, May 2013
[3] A. Mermoud, T. Lejeune, Performance Assessment of a Simulation Model
for PV modules of any available technology, 25th European Photovoltaic
Solar Energy Conference, Valencia, Spain, Sept. 2010
See Also
--------
calcparams_desoto
singlediode
'''
# Boltzmann constant in J/K
k = 1.38064852e-23
# elementary charge in coulomb
q = 1.6021766e-19
# reference temperature
Tref_K = temp_ref + 273.15
Tcell_K = temp_cell + 273.15
gamma = gamma_ref + mu_gamma * (Tcell_K - Tref_K)
nNsVth = gamma * k / q * cells_in_series * Tcell_K
IL = effective_irradiance / irrad_ref * \
(I_L_ref + alpha_sc * (Tcell_K - Tref_K))
I0 = I_o_ref * ((Tcell_K / Tref_K) ** 3) * \
(np.exp((q * EgRef) / (k * gamma) * (1 / Tref_K - 1 / Tcell_K)))
Rsh_tmp = \
(R_sh_ref - R_sh_0 * np.exp(-R_sh_exp)) / (1.0 - np.exp(-R_sh_exp))
Rsh_base = np.maximum(0.0, Rsh_tmp)
Rsh = Rsh_base + (R_sh_0 - Rsh_base) * \
np.exp(-R_sh_exp * effective_irradiance / irrad_ref)
Rs = R_s
return IL, I0, Rs, Rsh, nNsVth
[docs]def retrieve_sam(name=None, path=None):
'''
Retrieve latest module and inverter info from a local file or the
SAM website.
This function will retrieve either:
* CEC module database
* Sandia Module database
* CEC Inverter database
* Anton Driesse Inverter database
and return it as a pandas DataFrame.
Parameters
----------
name : None or string, default None
Name can be one of:
* 'CECMod' - returns the CEC module database
* 'CECInverter' - returns the CEC Inverter database
* 'SandiaInverter' - returns the CEC Inverter database
(CEC is only current inverter db available; tag kept for
backwards compatibility)
* 'SandiaMod' - returns the Sandia Module database
* 'ADRInverter' - returns the ADR Inverter database
path : None or string, default None
Path to the SAM file. May also be a URL.
If both name and path are None, a dialogue will open allowing the
user to select a file.
Returns
-------
samfile : DataFrame
A DataFrame containing all the elements of the desired database.
Each column represents a module or inverter, and a specific
dataset can be retrieved by the command
Notes
-----
Files available at https://sam.nrel.gov/sites/default/files/
Examples
--------
>>> from pvlib import pvsystem
>>> invdb = pvsystem.retrieve_sam('CECInverter')
>>> inverter = invdb.AE_Solar_Energy__AE6_0__277V__277V__CEC_2012_
>>> inverter
Vac 277.000000
Paco 6000.000000
Pdco 6165.670000
Vdco 361.123000
Pso 36.792300
C0 -0.000002
C1 -0.000047
C2 -0.001861
C3 0.000721
Pnt 0.070000
Vdcmax 600.000000
Idcmax 32.000000
Mppt_low 200.000000
Mppt_high 500.000000
Name: AE_Solar_Energy__AE6_0__277V__277V__CEC_2012_, dtype: float64
'''
if name is not None:
name = name.lower()
data_path = os.path.join(
os.path.dirname(os.path.abspath(__file__)), 'data')
if name == 'cecmod':
csvdata = os.path.join(
data_path, 'sam-library-cec-modules-2017-6-5.csv')
elif name == 'sandiamod':
csvdata = os.path.join(
data_path, 'sam-library-sandia-modules-2015-6-30.csv')
elif name == 'adrinverter':
csvdata = os.path.join(data_path, 'adr-library-2013-10-01.csv')
elif name in ['cecinverter', 'sandiainverter']:
# Allowing either, to provide for old code,
# while aligning with current expectations
csvdata = os.path.join(
data_path, 'sam-library-cec-inverters-2018-3-18.csv')
else:
raise ValueError('invalid name {}'.format(name))
elif path is not None:
if path.startswith('http'):
response = urlopen(path)
csvdata = io.StringIO(response.read().decode(errors='ignore'))
else:
csvdata = path
elif name is None and path is None:
try:
# python 2
import Tkinter as tkinter
from tkFileDialog import askopenfilename
except ImportError:
# python 3
import tkinter
from tkinter.filedialog import askopenfilename
tkinter.Tk().withdraw()
csvdata = askopenfilename()
return _parse_raw_sam_df(csvdata)
def _parse_raw_sam_df(csvdata):
df = pd.read_csv(csvdata, index_col=0, skiprows=[1, 2])
colnames = df.columns.values.tolist()
parsedcolnames = []
for cn in colnames:
parsedcolnames.append(cn.replace(' ', '_'))
df.columns = parsedcolnames
parsedindex = []
for index in df.index:
parsedindex.append(index.replace(' ', '_').replace('-', '_')
.replace('.', '_').replace('(', '_')
.replace(')', '_').replace('[', '_')
.replace(']', '_').replace(':', '_')
.replace('+', '_').replace('/', '_')
.replace('"', '_').replace(',', '_'))
df.index = parsedindex
df = df.transpose()
if 'ADRCoefficients' in df.index:
ad_ce = 'ADRCoefficients'
# for each inverter, parses a string of coefficients like
# ' 1.33, 2.11, 3.12' into a list containing floats:
# [1.33, 2.11, 3.12]
df.loc[ad_ce] = df.loc[ad_ce].map(lambda x: list(
map(float, x.strip(' []').split())))
return df
[docs]def sapm(effective_irradiance, temp_cell, module):
'''
The Sandia PV Array Performance Model (SAPM) generates 5 points on a
PV module's I-V curve (Voc, Isc, Ix, Ixx, Vmp/Imp) according to
SAND2004-3535. Assumes a reference cell temperature of 25 C.
Parameters
----------
effective_irradiance : numeric
Effective irradiance (suns).
temp_cell : numeric
The cell temperature (degrees C).
module : dict-like
A dict, Series, or DataFrame defining the SAPM performance
parameters. See the notes section for more details.
Returns
-------
A DataFrame with the columns:
* i_sc : Short-circuit current (A)
* i_mp : Current at the maximum-power point (A)
* v_oc : Open-circuit voltage (V)
* v_mp : Voltage at maximum-power point (V)
* p_mp : Power at maximum-power point (W)
* i_x : Current at module V = 0.5Voc, defines 4th point on I-V
curve for modeling curve shape
* i_xx : Current at module V = 0.5(Voc+Vmp), defines 5th point on
I-V curve for modeling curve shape
Notes
-----
The coefficients from SAPM which are required in ``module`` are
listed in the following table.
The modules in the Sandia module database contain these
coefficients, but the modules in the CEC module database do not.
Both databases can be accessed using :py:func:`retrieve_sam`.
================ ========================================================
Key Description
================ ========================================================
A0-A4 The airmass coefficients used in calculating
effective irradiance
B0-B5 The angle of incidence coefficients used in calculating
effective irradiance
C0-C7 The empirically determined coefficients relating
Imp, Vmp, Ix, and Ixx to effective irradiance
Isco Short circuit current at reference condition (amps)
Impo Maximum power current at reference condition (amps)
Aisc Short circuit current temperature coefficient at
reference condition (1/C)
Aimp Maximum power current temperature coefficient at
reference condition (1/C)
Bvoco Open circuit voltage temperature coefficient at
reference condition (V/C)
Mbvoc Coefficient providing the irradiance dependence for the
BetaVoc temperature coefficient at reference irradiance
(V/C)
Bvmpo Maximum power voltage temperature coefficient at
reference condition
Mbvmp Coefficient providing the irradiance dependence for the
BetaVmp temperature coefficient at reference irradiance
(V/C)
N Empirically determined "diode factor" (dimensionless)
Cells_in_Series Number of cells in series in a module's cell string(s)
IXO Ix at reference conditions
IXXO Ixx at reference conditions
FD Fraction of diffuse irradiance used by module
================ ========================================================
References
----------
[1] King, D. et al, 2004, "Sandia Photovoltaic Array Performance
Model", SAND Report 3535, Sandia National Laboratories, Albuquerque,
NM.
See Also
--------
retrieve_sam
sapm_celltemp
'''
T0 = 25
q = 1.60218e-19 # Elementary charge in units of coulombs
kb = 1.38066e-23 # Boltzmann's constant in units of J/K
# avoid problem with integer input
Ee = np.array(effective_irradiance, dtype='float64')
# set up masking for 0, positive, and nan inputs
Ee_gt_0 = np.full_like(Ee, False, dtype='bool')
Ee_eq_0 = np.full_like(Ee, False, dtype='bool')
notnan = ~np.isnan(Ee)
np.greater(Ee, 0, where=notnan, out=Ee_gt_0)
np.equal(Ee, 0, where=notnan, out=Ee_eq_0)
Bvmpo = module['Bvmpo'] + module['Mbvmp']*(1 - Ee)
Bvoco = module['Bvoco'] + module['Mbvoc']*(1 - Ee)
delta = module['N'] * kb * (temp_cell + 273.15) / q
# avoid repeated computation
logEe = np.full_like(Ee, np.nan)
np.log(Ee, where=Ee_gt_0, out=logEe)
logEe = np.where(Ee_eq_0, -np.inf, logEe)
# avoid repeated __getitem__
cells_in_series = module['Cells_in_Series']
out = OrderedDict()
out['i_sc'] = (
module['Isco'] * Ee * (1 + module['Aisc']*(temp_cell - T0)))
out['i_mp'] = (
module['Impo'] * (module['C0']*Ee + module['C1']*(Ee**2)) *
(1 + module['Aimp']*(temp_cell - T0)))
out['v_oc'] = np.maximum(0, (
module['Voco'] + cells_in_series * delta * logEe +
Bvoco*(temp_cell - T0)))
out['v_mp'] = np.maximum(0, (
module['Vmpo'] +
module['C2'] * cells_in_series * delta * logEe +
module['C3'] * cells_in_series * ((delta * logEe) ** 2) +
Bvmpo*(temp_cell - T0)))
out['p_mp'] = out['i_mp'] * out['v_mp']
out['i_x'] = (
module['IXO'] * (module['C4']*Ee + module['C5']*(Ee**2)) *
(1 + module['Aisc']*(temp_cell - T0)))
# the Ixx calculation in King 2004 has a typo (mixes up Aisc and Aimp)
out['i_xx'] = (
module['IXXO'] * (module['C6']*Ee + module['C7']*(Ee**2)) *
(1 + module['Aisc']*(temp_cell - T0)))
if isinstance(out['i_sc'], pd.Series):
out = pd.DataFrame(out)
return out
[docs]def sapm_celltemp(poa_global, wind_speed, temp_air,
model='open_rack_cell_glassback'):
'''
Estimate cell and module temperatures per the Sandia PV Array
Performance Model (SAPM, SAND2004-3535), from the incident
irradiance, wind speed, ambient temperature, and SAPM module
parameters.
Parameters
----------
poa_global : float or Series
Total incident irradiance in W/m^2.
wind_speed : float or Series
Wind speed in m/s at a height of 10 meters.
temp_air : float or Series
Ambient dry bulb temperature in degrees C.
model : string, list, or dict, default 'open_rack_cell_glassback'
Model to be used.
If string, can be:
* 'open_rack_cell_glassback' (default)
* 'roof_mount_cell_glassback'
* 'open_rack_cell_polymerback'
* 'insulated_back_polymerback'
* 'open_rack_polymer_thinfilm_steel'
* '22x_concentrator_tracker'
If dict, supply the following parameters
(if list, in the following order):
* a : float
SAPM module parameter for establishing the upper
limit for module temperature at low wind speeds and
high solar irradiance.
* b : float
SAPM module parameter for establishing the rate at
which the module temperature drops as wind speed increases
(see SAPM eqn. 11).
* deltaT : float
SAPM module parameter giving the temperature difference
between the cell and module back surface at the
reference irradiance, E0.
Returns
--------
DataFrame with columns 'temp_cell' and 'temp_module'.
Values in degrees C.
References
----------
[1] King, D. et al, 2004, "Sandia Photovoltaic Array Performance
Model", SAND Report 3535, Sandia National Laboratories, Albuquerque,
NM.
See Also
--------
sapm
'''
temp_models = {'open_rack_cell_glassback': [-3.47, -.0594, 3],
'roof_mount_cell_glassback': [-2.98, -.0471, 1],
'open_rack_cell_polymerback': [-3.56, -.0750, 3],
'insulated_back_polymerback': [-2.81, -.0455, 0],
'open_rack_polymer_thinfilm_steel': [-3.58, -.113, 3],
'22x_concentrator_tracker': [-3.23, -.130, 13]
}
if isinstance(model, str):
model = temp_models[model.lower()]
elif isinstance(model, (dict, pd.Series)):
model = [model['a'], model['b'], model['deltaT']]
a = model[0]
b = model[1]
deltaT = model[2]
E0 = 1000. # Reference irradiance
temp_module = pd.Series(poa_global*np.exp(a + b*wind_speed) + temp_air)
temp_cell = temp_module + (poa_global / E0)*(deltaT)
return pd.DataFrame({'temp_cell': temp_cell, 'temp_module': temp_module})
[docs]def sapm_spectral_loss(airmass_absolute, module):
"""
Calculates the SAPM spectral loss coefficient, F1.
Parameters
----------
airmass_absolute : numeric
Absolute airmass
module : dict-like
A dict, Series, or DataFrame defining the SAPM performance
parameters. See the :py:func:`sapm` notes section for more
details.
Returns
-------
F1 : numeric
The SAPM spectral loss coefficient.
Notes
-----
nan airmass values will result in 0 output.
"""
am_coeff = [module['A4'], module['A3'], module['A2'], module['A1'],
module['A0']]
spectral_loss = np.maximum(0, np.polyval(am_coeff, airmass_absolute))
spectral_loss = np.where(np.isnan(spectral_loss), 0, spectral_loss)
if isinstance(airmass_absolute, pd.Series):
spectral_loss = pd.Series(spectral_loss, airmass_absolute.index)
return spectral_loss
[docs]def sapm_aoi_loss(aoi, module, upper=None):
"""
Calculates the SAPM angle of incidence loss coefficient, F2.
Parameters
----------
aoi : numeric
Angle of incidence in degrees. Negative input angles will return
zeros.
module : dict-like
A dict, Series, or DataFrame defining the SAPM performance
parameters. See the :py:func:`sapm` notes section for more
details.
upper : None or float, default None
Upper limit on the results.
Returns
-------
F2 : numeric
The SAPM angle of incidence loss coefficient.
Notes
-----
The SAPM traditionally does not define an upper limit on the AOI
loss function and values slightly exceeding 1 may exist for moderate
angles of incidence (15-40 degrees). However, users may consider
imposing an upper limit of 1.
References
----------
[1] King, D. et al, 2004, "Sandia Photovoltaic Array Performance
Model", SAND Report 3535, Sandia National Laboratories, Albuquerque,
NM.
[2] B.H. King et al, "Procedure to Determine Coefficients for the
Sandia Array Performance Model (SAPM)," SAND2016-5284, Sandia
National Laboratories (2016).
[3] B.H. King et al, "Recent Advancements in Outdoor Measurement
Techniques for Angle of Incidence Effects," 42nd IEEE PVSC (2015).
DOI: 10.1109/PVSC.2015.7355849
"""
aoi_coeff = [module['B5'], module['B4'], module['B3'], module['B2'],
module['B1'], module['B0']]
aoi_loss = np.polyval(aoi_coeff, aoi)
aoi_loss = np.clip(aoi_loss, 0, upper)
# nan tolerant masking
aoi_lt_0 = np.full_like(aoi, False, dtype='bool')
np.less(aoi, 0, where=~np.isnan(aoi), out=aoi_lt_0)
aoi_loss = np.where(aoi_lt_0, 0, aoi_loss)
if isinstance(aoi, pd.Series):
aoi_loss = pd.Series(aoi_loss, aoi.index)
return aoi_loss
[docs]def sapm_effective_irradiance(poa_direct, poa_diffuse, airmass_absolute, aoi,
module, reference_irradiance=1000):
"""
Calculates the SAPM effective irradiance using the SAPM spectral
loss and SAPM angle of incidence loss functions.
Parameters
----------
poa_direct : numeric
The direct irradiance incident upon the module.
poa_diffuse : numeric
The diffuse irradiance incident on module.
airmass_absolute : numeric
Absolute airmass.
aoi : numeric
Angle of incidence in degrees.
module : dict-like
A dict, Series, or DataFrame defining the SAPM performance
parameters. See the :py:func:`sapm` notes section for more
details.
reference_irradiance : numeric, default 1000
Reference irradiance by which to divide the input irradiance.
Returns
-------
effective_irradiance : numeric
The SAPM effective irradiance.
"""
F1 = sapm_spectral_loss(airmass_absolute, module)
F2 = sapm_aoi_loss(aoi, module)
E0 = reference_irradiance
Ee = F1 * (poa_direct*F2 + module['FD']*poa_diffuse) / E0
return Ee
[docs]def singlediode(photocurrent, saturation_current, resistance_series,
resistance_shunt, nNsVth, ivcurve_pnts=None,
method='lambertw'):
"""
Solve the single-diode model to obtain a photovoltaic IV curve.
Singlediode solves the single diode equation [1]
.. math::
I = IL - I0*[exp((V+I*Rs)/(nNsVth))-1] - (V + I*Rs)/Rsh
for ``I`` and ``V`` when given ``IL, I0, Rs, Rsh,`` and ``nNsVth
(nNsVth = n*Ns*Vth)`` which are described later. Returns a DataFrame
which contains the 5 points on the I-V curve specified in
SAND2004-3535 [3]. If all IL, I0, Rs, Rsh, and nNsVth are scalar, a
single curve will be returned, if any are Series (of the same
length), multiple IV curves will be calculated.
The input parameters can be calculated using calcparams_desoto from
meteorological data.
Parameters
----------
photocurrent : numeric
Light-generated current (photocurrent) in amperes under desired
IV curve conditions. Often abbreviated ``I_L``.
0 <= photocurrent
saturation_current : numeric
Diode saturation current in amperes under desired IV curve
conditions. Often abbreviated ``I_0``.
0 < saturation_current
resistance_series : numeric
Series resistance in ohms under desired IV curve conditions.
Often abbreviated ``Rs``.
0 <= resistance_series < numpy.inf
resistance_shunt : numeric
Shunt resistance in ohms under desired IV curve conditions.
Often abbreviated ``Rsh``.
0 < resistance_shunt <= numpy.inf
nNsVth : numeric
The product of three components. 1) The usual diode ideal factor
(n), 2) the number of cells in series (Ns), and 3) the cell
thermal voltage under the desired IV curve conditions (Vth). The
thermal voltage of the cell (in volts) may be calculated as
``k*temp_cell/q``, where k is Boltzmann's constant (J/K),
temp_cell is the temperature of the p-n junction in Kelvin, and
q is the charge of an electron (coulombs).
0 < nNsVth
ivcurve_pnts : None or int, default None
Number of points in the desired IV curve. If None or 0, no
IV curves will be produced.
method : str, default 'lambertw'
Determines the method used to calculate points on the IV curve. The
options are ``'lambertw'``, ``'newton'``, or ``'brentq'``.
Returns
-------
OrderedDict or DataFrame
The returned dict-like object always contains the keys/columns:
* i_sc - short circuit current in amperes.
* v_oc - open circuit voltage in volts.
* i_mp - current at maximum power point in amperes.
* v_mp - voltage at maximum power point in volts.
* p_mp - power at maximum power point in watts.
* i_x - current, in amperes, at ``v = 0.5*v_oc``.
* i_xx - current, in amperes, at ``V = 0.5*(v_oc+v_mp)``.
If ivcurve_pnts is greater than 0, the output dictionary will also
include the keys:
* i - IV curve current in amperes.
* v - IV curve voltage in volts.
The output will be an OrderedDict if photocurrent is a scalar,
array, or ivcurve_pnts is not None.
The output will be a DataFrame if photocurrent is a Series and
ivcurve_pnts is None.
Notes
-----
If the method is ``'lambertw'`` then the solution employed to solve the
implicit diode equation utilizes the Lambert W function to obtain an
explicit function of :math:`V=f(I)` and :math:`I=f(V)` as shown in [2].
If the method is ``'newton'`` then the root-finding Newton-Raphson method
is used. It should be safe for well behaved IV-curves, but the ``'brentq'``
method is recommended for reliability.
If the method is ``'brentq'`` then Brent's bisection search method is used
that guarantees convergence by bounding the voltage between zero and
open-circuit.
If the method is either ``'newton'`` or ``'brentq'`` and ``ivcurve_pnts``
are indicated, then :func:`pvlib.singlediode.bishop88` [4] is used to
calculate the points on the IV curve points at diode voltages from zero to
open-circuit voltage with a log spacing that gets closer as voltage
increases. If the method is ``'lambertw'`` then the calculated points on
the IV curve are linearly spaced.
References
-----------
[1] S.R. Wenham, M.A. Green, M.E. Watt, "Applied Photovoltaics" ISBN
0 86758 909 4
[2] A. Jain, A. Kapoor, "Exact analytical solutions of the
parameters of real solar cells using Lambert W-function", Solar
Energy Materials and Solar Cells, 81 (2004) 269-277.
[3] D. King et al, "Sandia Photovoltaic Array Performance Model",
SAND2004-3535, Sandia National Laboratories, Albuquerque, NM
[4] "Computer simulation of the effects of electrical mismatches in
photovoltaic cell interconnection circuits" JW Bishop, Solar Cell (1988)
https://doi.org/10.1016/0379-6787(88)90059-2
See also
--------
sapm
calcparams_desoto
pvlib.singlediode.bishop88
"""
# Calculate points on the IV curve using the LambertW solution to the
# single diode equation
if method.lower() == 'lambertw':
out = _singlediode._lambertw(
photocurrent, saturation_current, resistance_series,
resistance_shunt, nNsVth, ivcurve_pnts
)
i_sc, v_oc, i_mp, v_mp, p_mp, i_x, i_xx = out[:7]
if ivcurve_pnts:
ivcurve_i, ivcurve_v = out[7:]
else:
# Calculate points on the IV curve using either 'newton' or 'brentq'
# methods. Voltages are determined by first solving the single diode
# equation for the diode voltage V_d then backing out voltage
args = (photocurrent, saturation_current, resistance_series,
resistance_shunt, nNsVth) # collect args
v_oc = _singlediode.bishop88_v_from_i(
0.0, *args, method=method.lower()
)
i_mp, v_mp, p_mp = _singlediode.bishop88_mpp(
*args, method=method.lower()
)
i_sc = _singlediode.bishop88_i_from_v(
0.0, *args, method=method.lower()
)
i_x = _singlediode.bishop88_i_from_v(
v_oc / 2.0, *args, method=method.lower()
)
i_xx = _singlediode.bishop88_i_from_v(
(v_oc + v_mp) / 2.0, *args, method=method.lower()
)
# calculate the IV curve if requested using bishop88
if ivcurve_pnts:
vd = v_oc * (
(11.0 - np.logspace(np.log10(11.0), 0.0,
ivcurve_pnts)) / 10.0
)
ivcurve_i, ivcurve_v, _ = _singlediode.bishop88(vd, *args)
out = OrderedDict()
out['i_sc'] = i_sc
out['v_oc'] = v_oc
out['i_mp'] = i_mp
out['v_mp'] = v_mp
out['p_mp'] = p_mp
out['i_x'] = i_x
out['i_xx'] = i_xx
if ivcurve_pnts:
out['v'] = ivcurve_v
out['i'] = ivcurve_i
if isinstance(photocurrent, pd.Series) and not ivcurve_pnts:
out = pd.DataFrame(out, index=photocurrent.index)
return out
[docs]def max_power_point(photocurrent, saturation_current, resistance_series,
resistance_shunt, nNsVth, method='brentq'):
"""
Given the single diode equation coefficients, calculates the maximum power
point (MPP).
Parameters
----------
photocurrent : numeric
photo-generated current [A]
saturation_current : numeric
diode reverse saturation current [A]
resistance_series : numeric
series resitance [ohms]
resistance_shunt : numeric
shunt resitance [ohms]
nNsVth : numeric
product of thermal voltage ``Vth`` [V], diode ideality factor ``n``,
and number of serices cells ``Ns``
method : str
either ``'newton'`` or ``'brentq'``
Returns
-------
OrderedDict or pandas.Datafrane
``(i_mp, v_mp, p_mp)``
Notes
-----
Use this function when you only want to find the maximum power point. Use
:func:`singlediode` when you need to find additional points on the IV
curve. This function uses Brent's method by default because it is
guaranteed to converge.
"""
i_mp, v_mp, p_mp = _singlediode.bishop88_mpp(
photocurrent, saturation_current, resistance_series,
resistance_shunt, nNsVth, method=method.lower()
)
if isinstance(photocurrent, pd.Series):
ivp = {'i_mp': i_mp, 'v_mp': v_mp, 'p_mp': p_mp}
out = pd.DataFrame(ivp, index=photocurrent.index)
else:
out = OrderedDict()
out['i_mp'] = i_mp
out['v_mp'] = v_mp
out['p_mp'] = p_mp
return out
[docs]def v_from_i(resistance_shunt, resistance_series, nNsVth, current,
saturation_current, photocurrent, method='lambertw'):
'''
Device voltage at the given device current for the single diode model.
Uses the single diode model (SDM) as described in, e.g.,
Jain and Kapoor 2004 [1].
The solution is per Eq 3 of [1] except when resistance_shunt=numpy.inf,
in which case the explict solution for voltage is used.
Ideal device parameters are specified by resistance_shunt=np.inf and
resistance_series=0.
Inputs to this function can include scalars and pandas.Series, but it is
the caller's responsibility to ensure that the arguments are all float64
and within the proper ranges.
Parameters
----------
resistance_shunt : numeric
Shunt resistance in ohms under desired IV curve conditions.
Often abbreviated ``Rsh``.
0 < resistance_shunt <= numpy.inf
resistance_series : numeric
Series resistance in ohms under desired IV curve conditions.
Often abbreviated ``Rs``.
0 <= resistance_series < numpy.inf
nNsVth : numeric
The product of three components. 1) The usual diode ideal factor
(n), 2) the number of cells in series (Ns), and 3) the cell
thermal voltage under the desired IV curve conditions (Vth). The
thermal voltage of the cell (in volts) may be calculated as
``k*temp_cell/q``, where k is Boltzmann's constant (J/K),
temp_cell is the temperature of the p-n junction in Kelvin, and
q is the charge of an electron (coulombs).
0 < nNsVth
current : numeric
The current in amperes under desired IV curve conditions.
saturation_current : numeric
Diode saturation current in amperes under desired IV curve
conditions. Often abbreviated ``I_0``.
0 < saturation_current
photocurrent : numeric
Light-generated current (photocurrent) in amperes under desired
IV curve conditions. Often abbreviated ``I_L``.
0 <= photocurrent
method : str
Method to use: ``'lambertw'``, ``'newton'``, or ``'brentq'``. *Note*:
``'brentq'`` is limited to 1st quadrant only.
Returns
-------
current : np.ndarray or scalar
References
----------
[1] A. Jain, A. Kapoor, "Exact analytical solutions of the
parameters of real solar cells using Lambert W-function", Solar
Energy Materials and Solar Cells, 81 (2004) 269-277.
'''
if method.lower() == 'lambertw':
return _singlediode._lambertw_v_from_i(
resistance_shunt, resistance_series, nNsVth, current,
saturation_current, photocurrent
)
else:
# Calculate points on the IV curve using either 'newton' or 'brentq'
# methods. Voltages are determined by first solving the single diode
# equation for the diode voltage V_d then backing out voltage
args = (current, photocurrent, saturation_current,
resistance_series, resistance_shunt, nNsVth)
V = _singlediode.bishop88_v_from_i(*args, method=method.lower())
# find the right size and shape for returns
size, shape = _singlediode._get_size_and_shape(args)
if size <= 1:
if shape is not None:
V = np.tile(V, shape)
if np.isnan(V).any() and size <= 1:
V = np.repeat(V, size)
if shape is not None:
V = V.reshape(shape)
return V
[docs]def i_from_v(resistance_shunt, resistance_series, nNsVth, voltage,
saturation_current, photocurrent, method='lambertw'):
'''
Device current at the given device voltage for the single diode model.
Uses the single diode model (SDM) as described in, e.g.,
Jain and Kapoor 2004 [1].
The solution is per Eq 2 of [1] except when resistance_series=0,
in which case the explict solution for current is used.
Ideal device parameters are specified by resistance_shunt=np.inf and
resistance_series=0.
Inputs to this function can include scalars and pandas.Series, but it is
the caller's responsibility to ensure that the arguments are all float64
and within the proper ranges.
Parameters
----------
resistance_shunt : numeric
Shunt resistance in ohms under desired IV curve conditions.
Often abbreviated ``Rsh``.
0 < resistance_shunt <= numpy.inf
resistance_series : numeric
Series resistance in ohms under desired IV curve conditions.
Often abbreviated ``Rs``.
0 <= resistance_series < numpy.inf
nNsVth : numeric
The product of three components. 1) The usual diode ideal factor
(n), 2) the number of cells in series (Ns), and 3) the cell
thermal voltage under the desired IV curve conditions (Vth). The
thermal voltage of the cell (in volts) may be calculated as
``k*temp_cell/q``, where k is Boltzmann's constant (J/K),
temp_cell is the temperature of the p-n junction in Kelvin, and
q is the charge of an electron (coulombs).
0 < nNsVth
voltage : numeric
The voltage in Volts under desired IV curve conditions.
saturation_current : numeric
Diode saturation current in amperes under desired IV curve
conditions. Often abbreviated ``I_0``.
0 < saturation_current
photocurrent : numeric
Light-generated current (photocurrent) in amperes under desired
IV curve conditions. Often abbreviated ``I_L``.
0 <= photocurrent
method : str
Method to use: ``'lambertw'``, ``'newton'``, or ``'brentq'``. *Note*:
``'brentq'`` is limited to 1st quadrant only.
Returns
-------
current : np.ndarray or scalar
References
----------
[1] A. Jain, A. Kapoor, "Exact analytical solutions of the
parameters of real solar cells using Lambert W-function", Solar
Energy Materials and Solar Cells, 81 (2004) 269-277.
'''
if method.lower() == 'lambertw':
return _singlediode._lambertw_i_from_v(
resistance_shunt, resistance_series, nNsVth, voltage,
saturation_current, photocurrent
)
else:
# Calculate points on the IV curve using either 'newton' or 'brentq'
# methods. Voltages are determined by first solving the single diode
# equation for the diode voltage V_d then backing out voltage
args = (voltage, photocurrent, saturation_current, resistance_series,
resistance_shunt, nNsVth)
I = _singlediode.bishop88_i_from_v(*args, method=method.lower())
# find the right size and shape for returns
size, shape = _singlediode._get_size_and_shape(args)
if size <= 1:
if shape is not None:
I = np.tile(I, shape)
if np.isnan(I).any() and size <= 1:
I = np.repeat(I, size)
if shape is not None:
I = I.reshape(shape)
return I
[docs]def snlinverter(v_dc, p_dc, inverter):
r'''
Converts DC power and voltage to AC power using Sandia's
Grid-Connected PV Inverter model.
Determines the AC power output of an inverter given the DC voltage,
DC power, and appropriate Sandia Grid-Connected Photovoltaic
Inverter Model parameters. The output, ac_power, is clipped at the
maximum power output, and gives a negative power during low-input
power conditions, but does NOT account for maximum power point
tracking voltage windows nor maximum current or voltage limits on
the inverter.
Parameters
----------
v_dc : numeric
DC voltages, in volts, which are provided as input to the
inverter. Vdc must be >= 0.
p_dc : numeric
A scalar or DataFrame of DC powers, in watts, which are provided
as input to the inverter. Pdc must be >= 0.
inverter : dict-like
A dict-like object defining the inverter to be used, giving the
inverter performance parameters according to the Sandia
Grid-Connected Photovoltaic Inverter Model (SAND 2007-5036) [1].
A set of inverter performance parameters are provided with
pvlib, or may be generated from a System Advisor Model (SAM) [2]
library using retrievesam. See Notes for required keys.
Returns
-------
ac_power : numeric
Modeled AC power output given the input DC voltage, Vdc, and
input DC power, Pdc. When ac_power would be greater than Pac0,
it is set to Pac0 to represent inverter "clipping". When
ac_power would be less than Ps0 (startup power required), then
ac_power is set to -1*abs(Pnt) to represent nightly power
losses. ac_power is not adjusted for maximum power point
tracking (MPPT) voltage windows or maximum current limits of the
inverter.
Notes
-----
Required inverter keys are:
====== ============================================================
Column Description
====== ============================================================
Pac0 AC-power output from inverter based on input power
and voltage (W)
Pdc0 DC-power input to inverter, typically assumed to be equal
to the PV array maximum power (W)
Vdc0 DC-voltage level at which the AC-power rating is achieved
at the reference operating condition (V)
Ps0 DC-power required to start the inversion process, or
self-consumption by inverter, strongly influences inverter
efficiency at low power levels (W)
C0 Parameter defining the curvature (parabolic) of the
relationship between ac-power and dc-power at the reference
operating condition, default value of zero gives a
linear relationship (1/W)
C1 Empirical coefficient allowing Pdco to vary linearly
with dc-voltage input, default value is zero (1/V)
C2 Empirical coefficient allowing Pso to vary linearly with
dc-voltage input, default value is zero (1/V)
C3 Empirical coefficient allowing Co to vary linearly with
dc-voltage input, default value is zero (1/V)
Pnt AC-power consumed by inverter at night (night tare) to
maintain circuitry required to sense PV array voltage (W)
====== ============================================================
References
----------
[1] SAND2007-5036, "Performance Model for Grid-Connected
Photovoltaic Inverters by D. King, S. Gonzalez, G. Galbraith, W.
Boyson
[2] System Advisor Model web page. https://sam.nrel.gov.
See also
--------
sapm
singlediode
'''
Paco = inverter['Paco']
Pdco = inverter['Pdco']
Vdco = inverter['Vdco']
Pso = inverter['Pso']
C0 = inverter['C0']
C1 = inverter['C1']
C2 = inverter['C2']
C3 = inverter['C3']
Pnt = inverter['Pnt']
A = Pdco * (1 + C1*(v_dc - Vdco))
B = Pso * (1 + C2*(v_dc - Vdco))
C = C0 * (1 + C3*(v_dc - Vdco))
ac_power = (Paco/(A-B) - C*(A-B)) * (p_dc-B) + C*((p_dc-B)**2)
ac_power = np.minimum(Paco, ac_power)
ac_power = np.where(p_dc < Pso, -1.0 * abs(Pnt), ac_power)
if isinstance(p_dc, pd.Series):
ac_power = pd.Series(ac_power, index=p_dc.index)
return ac_power
def adrinverter(v_dc, p_dc, inverter, vtol=0.10):
r'''
Converts DC power and voltage to AC power using Anton Driesse's
Grid-Connected PV Inverter efficiency model
Parameters
----------
v_dc : numeric
A scalar or pandas series of DC voltages, in volts, which are provided
as input to the inverter. If Vdc and Pdc are vectors, they must be
of the same size. v_dc must be >= 0. (V)
p_dc : numeric
A scalar or pandas series of DC powers, in watts, which are provided
as input to the inverter. If Vdc and Pdc are vectors, they must be
of the same size. p_dc must be >= 0. (W)
inverter : dict-like
A dict-like object defining the inverter to be used, giving the
inverter performance parameters according to the model
developed by Anton Driesse [1].
A set of inverter performance parameters may be loaded from the
supplied data table using retrievesam.
See Notes for required keys.
vtol : numeric, default 0.1
A unit-less fraction that determines how far the efficiency model is
allowed to extrapolate beyond the inverter's normal input voltage
operating range. 0.0 <= vtol <= 1.0
Returns
-------
ac_power : numeric
A numpy array or pandas series of modeled AC power output given the
input DC voltage, v_dc, and input DC power, p_dc. When ac_power would
be greater than pac_max, it is set to p_max to represent inverter
"clipping". When ac_power would be less than -p_nt (energy consumed
rather than produced) then ac_power is set to -p_nt to represent
nightly power losses. ac_power is not adjusted for maximum power point
tracking (MPPT) voltage windows or maximum current limits of the
inverter.
Notes
-----
Required inverter keys are:
======= ============================================================
Column Description
======= ============================================================
p_nom The nominal power value used to normalize all power values,
typically the DC power needed to produce maximum AC power
output, (W).
v_nom The nominal DC voltage value used to normalize DC voltage
values, typically the level at which the highest efficiency
is achieved, (V).
pac_max The maximum AC output power value, used to clip the output
if needed, (W).
ce_list This is a list of 9 coefficients that capture the influence
of input voltage and power on inverter losses, and thereby
efficiency.
p_nt ac-power consumed by inverter at night (night tare) to
maintain circuitry required to sense PV array voltage, (W).
======= ============================================================
References
----------
[1] Beyond the Curves: Modeling the Electrical Efficiency
of Photovoltaic Inverters, PVSC 2008, Anton Driesse et. al.
See also
--------
sapm
singlediode
'''
p_nom = inverter['Pnom']
v_nom = inverter['Vnom']
pac_max = inverter['Pacmax']
p_nt = inverter['Pnt']
ce_list = inverter['ADRCoefficients']
v_max = inverter['Vmax']
v_min = inverter['Vmin']
vdc_max = inverter['Vdcmax']
mppt_hi = inverter['MPPTHi']
mppt_low = inverter['MPPTLow']
v_lim_upper = np.nanmax([v_max, vdc_max, mppt_hi]) * (1 + vtol)
v_lim_lower = np.nanmax([v_min, mppt_low]) * (1 - vtol)
pdc = p_dc / p_nom
vdc = v_dc / v_nom
# zero voltage will lead to division by zero, but since power is
# set to night time value later, these errors can be safely ignored
with np.errstate(invalid='ignore', divide='ignore'):
poly = np.array([pdc**0, # replace with np.ones_like?
pdc,
pdc**2,
vdc - 1,
pdc * (vdc - 1),
pdc**2 * (vdc - 1),
1. / vdc - 1, # divide by 0
pdc * (1. / vdc - 1), # invalid 0./0. --> nan
pdc**2 * (1. / vdc - 1)]) # divide by 0
p_loss = np.dot(np.array(ce_list), poly)
ac_power = p_nom * (pdc-p_loss)
p_nt = -1 * np.absolute(p_nt)
# set output to nan where input is outside of limits
# errstate silences case where input is nan
with np.errstate(invalid='ignore'):
invalid = (v_lim_upper < v_dc) | (v_dc < v_lim_lower)
ac_power = np.where(invalid, np.nan, ac_power)
# set night values
ac_power = np.where(vdc == 0, p_nt, ac_power)
ac_power = np.maximum(ac_power, p_nt)
# set max ac output
ac_power = np.minimum(ac_power, pac_max)
if isinstance(p_dc, pd.Series):
ac_power = pd.Series(ac_power, index=pdc.index)
return ac_power
[docs]def scale_voltage_current_power(data, voltage=1, current=1):
"""
Scales the voltage, current, and power of the DataFrames
returned by :py:func:`singlediode` and :py:func:`sapm`.
Parameters
----------
data: DataFrame
Must contain columns `'v_mp', 'v_oc', 'i_mp' ,'i_x', 'i_xx',
'i_sc', 'p_mp'`.
voltage: numeric, default 1
The amount by which to multiply the voltages.
current: numeric, default 1
The amount by which to multiply the currents.
Returns
-------
scaled_data: DataFrame
A scaled copy of the input data.
`'p_mp'` is scaled by `voltage * current`.
"""
# as written, only works with a DataFrame
# could make it work with a dict, but it would be more verbose
data = data.copy()
voltages = ['v_mp', 'v_oc']
currents = ['i_mp', 'i_x', 'i_xx', 'i_sc']
data[voltages] *= voltage
data[currents] *= current
data['p_mp'] *= voltage * current
return data
[docs]def pvwatts_dc(g_poa_effective, temp_cell, pdc0, gamma_pdc, temp_ref=25.):
r"""
Implements NREL's PVWatts DC power model [1]_:
.. math::
P_{dc} = \frac{G_{poa eff}}{1000} P_{dc0} ( 1 + \gamma_{pdc} (T_{cell} - T_{ref}))
Parameters
----------
g_poa_effective: numeric
Irradiance transmitted to the PV cells in units of W/m**2. To be
fully consistent with PVWatts, the user must have already
applied angle of incidence losses, but not soiling, spectral,
etc.
temp_cell: numeric
Cell temperature in degrees C.
pdc0: numeric
Nameplate DC rating.
gamma_pdc: numeric
The temperature coefficient in units of 1/C. Typically -0.002 to
-0.005 per degree C.
temp_ref: numeric, default 25.0
Cell reference temperature. PVWatts defines it to be 25 C and
is included here for flexibility.
Returns
-------
pdc: numeric
DC power.
References
----------
.. [1] A. P. Dobos, "PVWatts Version 5 Manual"
http://pvwatts.nrel.gov/downloads/pvwattsv5.pdf
(2014).
"""
pdc = (g_poa_effective * 0.001 * pdc0 *
(1 + gamma_pdc * (temp_cell - temp_ref)))
return pdc
[docs]def pvwatts_losses(soiling=2, shading=3, snow=0, mismatch=2, wiring=2,
connections=0.5, lid=1.5, nameplate_rating=1, age=0,
availability=3):
r"""
Implements NREL's PVWatts system loss model [1]_:
.. math::
L_{total}(\%) = 100 [ 1 - \Pi_i ( 1 - \frac{L_i}{100} ) ]
All parameters must be in units of %. Parameters may be
array-like, though all array sizes must match.
Parameters
----------
soiling: numeric, default 2
shading: numeric, default 3
snow: numeric, default 0
mismatch: numeric, default 2
wiring: numeric, default 2
connections: numeric, default 0.5
lid: numeric, default 1.5
Light induced degradation
nameplate_rating: numeric, default 1
age: numeric, default 0
availability: numeric, default 3
Returns
-------
losses: numeric
System losses in units of %.
References
----------
.. [1] A. P. Dobos, "PVWatts Version 5 Manual"
http://pvwatts.nrel.gov/downloads/pvwattsv5.pdf
(2014).
"""
params = [soiling, shading, snow, mismatch, wiring, connections, lid,
nameplate_rating, age, availability]
# manually looping over params allows for numpy/pandas to handle any
# array-like broadcasting that might be necessary.
perf = 1
for param in params:
perf *= 1 - param/100
losses = (1 - perf) * 100.
return losses
[docs]def pvwatts_ac(pdc, pdc0, eta_inv_nom=0.96, eta_inv_ref=0.9637):
r"""
Implements NREL's PVWatts inverter model [1]_.
.. math::
\eta = \frac{\eta_{nom}}{\eta_{ref}} (-0.0162\zeta - \frac{0.0059}{\zeta} + 0.9858)
.. math::
P_{ac} = \min(\eta P_{dc}, P_{ac0})
where :math:`\zeta=P_{dc}/P_{dc0}` and :math:`P_{dc0}=P_{ac0}/\eta_{nom}`.
Parameters
----------
pdc: numeric
DC power.
pdc0: numeric
Nameplate DC rating.
eta_inv_nom: numeric, default 0.96
Nominal inverter efficiency.
eta_inv_ref: numeric, default 0.9637
Reference inverter efficiency. PVWatts defines it to be 0.9637
and is included here for flexibility.
Returns
-------
pac: numeric
AC power.
References
----------
.. [1] A. P. Dobos, "PVWatts Version 5 Manual,"
http://pvwatts.nrel.gov/downloads/pvwattsv5.pdf
(2014).
"""
pac0 = eta_inv_nom * pdc0
zeta = pdc / pdc0
# eta < 0 if zeta < 0.006. pac is forced to be >= 0 below. GH 541
eta = eta_inv_nom / eta_inv_ref * (-0.0162*zeta - 0.0059/zeta + 0.9858)
pac = eta * pdc
pac = np.minimum(pac0, pac)
pac = np.maximum(0, pac) # GH 541
return pac