271 lines
12 KiB
Python
271 lines
12 KiB
Python
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# Paul Gasper, NREL
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import numpy as np
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from functions.extract_stressors import extract_stressors
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from functions.state_functions import update_power_B_state, update_sigmoid_state
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import scipy.stats as stats
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# EXPERIMENTAL AGING DATA SUMMARY:
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# Aging test matrix varied temperature and state-of-charge for calendar aging, and
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# varied depth-of-discharge, average state-of-charge, and C-rates for cycle aging.
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# There is NO LOW TEMPERATURE cycling aging data, i.e., no lithium-plating induced by
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# kinetic limitations on cell performance; CYCLING WAS ONLY DONE AT 25 CELSIUS AND 45 CELSIUS,
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# so any model predictions at low temperature cannot incorporate low temperature degradation modes.
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# Discharge capacity
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# MODEL SENSITIVITY
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# The model predicts degradation rate versus time as a function of temperature and average
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# state-of-charge and degradation rate versus equivalent full cycles (charge-throughput) as
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# a function of average state-of-charge during a cycle, depth-of-discharge, and average of the
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# charge and discharge C-rates.
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# MODEL LIMITATIONS
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# There is no influence of TEMPERATURE on CYCLING DEGRADATION RATE due to limited data. This is
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# NOT PHYSICALLY REALISTIC AND IS BASED ON LIMITED DATA.
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class Lfp_Gr_SonyMurata3Ah_Battery:
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# Model predicting the degradation of Sony-Murata 3 Ah LFP-Gr cylindrical cells.
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# Data is from Technical University of Munich, reported in studies led by Maik Naumann.
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# Capacity model identification was conducted at NREL. Resistance model is from Naumann et al.
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# Naumann et al used an interative fitting procedure, but it was found that lower model error could be
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# achieved by simply reoptimizing all resistance growth parameters to the entire data set.
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# Calendar aging data source: https://doi.org/10.1016/j.est.2018.01.019
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# Cycle aging data source: https://doi.org/10.1016/j.jpowsour.2019.227666
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# Model identification source: https://doi.org/10.1149/1945-7111/ac86a8
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# Degradation rate is a function of the aging stressors, i.e., ambient temperature and use.
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# The state of the battery is updated throughout the lifetime of the cell.
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# Performance metrics are capacity and DC resistance. These metrics change as a function of the
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# cell's current degradation state, as well as the ambient temperature. The model predicts time and
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# cycling dependent degradation. Cycling dependent degradation includes a break-in mechanism as well
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# as long term cycling fade; the break-in mechanism strongly influenced results of the accelerated
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# aging test, but is not expected to have much influence on real-world applications.
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# Parameters to modify to change fade rates:
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# q1_b0: rate of capacity loss due to calendar degradation
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# q5_b0: rate of capacity loss due to cycling degradation
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# k_ref_r_cal: rate of resistance growth due to calendar degradation
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# A_r_cyc: rate of resistance growth due to cycling degradation
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def __init__(self):
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# States: Internal states of the battery model
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self.states = {
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'qLoss_LLI_t': np.array([0]),
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'qLoss_LLI_EFC': np.array([0]),
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'qLoss_BreakIn_EFC': np.array([1e-10]),
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'rGain_LLI_t': np.array([0]),
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'rGain_LLI_EFC': np.array([0]),
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}
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# Outputs: Battery properties derived from state values
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self.outputs = {
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'q': np.array([1]),
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'q_LLI_t': np.array([1]),
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'q_LLI_EFC': np.array([1]),
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'q_BreakIn_EFC': np.array([1]),
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'r': np.array([1]),
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'r_LLI_t': np.array([1]),
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'r_LLI_EFC': np.array([1]),
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}
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# Stressors: History of stressors on the battery
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self.stressors = {
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'delta_t_days': np.array([np.nan]),
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't_days': np.array([0]),
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'delta_efc': np.array([np.nan]),
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'efc': np.array([0]),
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'TdegK': np.array([np.nan]),
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'soc': np.array([np.nan]),
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'Ua': np.array([np.nan]),
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'dod': np.array([np.nan]),
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'Crate': np.array([np.nan]),
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}
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# Rates: History of stressor-dependent degradation rates
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self.rates = {
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'q1': np.array([np.nan]),
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'q3': np.array([np.nan]),
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'q5': np.array([np.nan]),
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'q7': np.array([np.nan]),
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'r_kcal': np.array([np.nan]),
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'r_kcyc': np.array([np.nan]),
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}
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# Nominal capacity
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@property
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def _cap(self):
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return 3
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# Define life model parameters
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@property
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def _params_life(self):
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return {
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# Capacity fade parameters
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'q2': 0.000130510034211874,
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'q1_b0': 0.989687151293590, # CHANGE to modify calendar degradation rate
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'q1_b1': -2881067.56019324,
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'q1_b2': 8742.06309157261,
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'q3_b0': 0.000332850281062177,
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'q3_b1': 734553185711.369,
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'q3_b2': -2.82161575620780e-06,
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'q3_b3': -3284991315.45121,
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'q3_b4': 0.00127227593657290,
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'q8': 0.00303553871631028,
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'q9': 1.43752162947637,
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'q7_b0': 0.582258029148225,
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'q7_soc_skew': 0.0583128906965484,
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'q7_soc_width': 0.208738181522897,
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'q7_dod_skew': -3.80744333129564,
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'q7_dod_width': 1.16126260428210,
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'q7_dod_growth': 25.4130804598602,
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'q6': 1.12847759334355,
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'q5_b0': -6.81260579372875e-06, # CHANGE to modify cycling degradation rate
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'q5_b1': 2.59615973160844e-05,
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'q5_b2': 2.11559710307295e-06,
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# Resistance growth parameters
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'k_ref_r_cal': 3.4194e-10, # CHANGE to modify calendar degradation rate
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'Ea_r_cal': 71827,
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'C_r_cal': -3.3903,
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'D_r_cal': 1.5604,
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'A_r_cyc': -0.002, # CHANGE to modify cycling degradation rate
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'B_r_cyc': 0.0021,
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'C_r_cyc': 6.8477,
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'D_r_cyc': 0.91882
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}
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# Battery model
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def update_battery_state(self, t_secs, soc, T_celsius):
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# Update the battery states, based both on the degradation state as well as the battery performance
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# at the ambient temperature, T_celsius
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# Inputs:
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# t_secs (ndarry): vector of the time in seconds since beginning of life for the soc_timeseries data points
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# soc (ndarry): vector of the state-of-charge of the battery at each t_sec
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# T_celsius (ndarray): the temperature of the battery during this time period, in Celsius units.
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# Check some input types:
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if not isinstance(t_secs, np.ndarray):
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raise TypeError('Input "t_secs" must be a numpy.ndarray')
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if not isinstance(soc, np.ndarray):
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raise TypeError('Input "soc" must be a numpy.ndarray')
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if not isinstance(T_celsius, np.ndarray):
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raise TypeError('Input "T_celsius" must be a numpy.ndarray')
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if not (len(t_secs) == len(soc) and len(t_secs) == len(T_celsius)):
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raise ValueError('All input timeseries must be the same length')
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self.__update_states(t_secs, soc, T_celsius)
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self.__update_outputs()
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def __update_states(self, t_secs, soc, T_celsius):
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# Update the battery states, based both on the degradation state as well as the battery performance
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# at the ambient temperature, T_celsius
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# Inputs:
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# t_secs (ndarry): vector of the time in seconds since beginning of life for the soc_timeseries data points
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# soc (ndarry): vector of the state-of-charge of the battery at each t_sec
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# T_celsius (ndarray): the temperature of the battery during this time period, in Celsius units.
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# Extract stressors
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delta_t_secs = t_secs[-1] - t_secs[0]
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delta_t_days, delta_efc, TdegK, soc, Ua, dod, Crate, cycles = extract_stressors(t_secs, soc, T_celsius)
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# Grab parameters
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p = self._params_life
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# Calculate the degradation coefficients
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q1 = np.abs(
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p['q1_b0']
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* np.exp(p['q1_b1']*(1/(TdegK**2))*(Ua**0.5))
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* np.exp(p['q1_b2']*(1/TdegK)*(Ua**0.5))
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)
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q3 = np.abs(
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p['q3_b0']
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* np.exp(p['q3_b1']*(1/(TdegK**4))*(Ua**(1/3)))
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* np.exp(p['q3_b2']*(TdegK**3)*(Ua**(1/4)))
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* np.exp(p['q3_b3']*(1/(TdegK**3))*(Ua**(1/3)))
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* np.exp(p['q3_b4']*(TdegK**2)*(Ua**(1/4)))
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)
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q5 = np.abs(
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p['q5_b0']
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+ p['q5_b1']*dod
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+ p['q5_b2']*np.exp((dod**2)*(Crate**3))
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)
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q7 = np.abs(
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p['q7_b0']
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* skewnormpdf(soc, p['q7_soc_skew'], p['q7_soc_width'])
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* skewnormpdf(dod, p['q7_dod_skew'], p['q7_dod_width'])
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* sigmoid(dod, 1, p['q7_dod_growth'], 1)
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)
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k_temp_r_cal = (
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p['k_ref_r_cal']
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* np.exp((-p['Ea_r_cal'] / 8.3144) * (1/TdegK - 1/298.15))
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)
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k_soc_r_cal = p['C_r_cal'] * (soc - 0.5)**3 + p['D_r_cal']
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k_Crate_r_cyc = p['A_r_cyc'] * Crate + p['B_r_cyc']
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k_dod_r_cyc = p['C_r_cyc']* (dod - 0.5)**3 + p['D_r_cyc']
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# Calculate time based average of each rate
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q1 = np.trapz(q1, x=t_secs) / delta_t_secs
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q3 = np.trapz(q3, x=t_secs) / delta_t_secs
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#q5 = np.trapz(q5, x=t_secs) / delta_t_secs # no time varying inputs
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q7 = np.trapz(q7, x=t_secs) / delta_t_secs # no time varying inputs
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k_temp_r_cal = np.trapz(k_temp_r_cal, x=t_secs) / delta_t_secs
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k_soc_r_cal = np.trapz(k_soc_r_cal, x=t_secs) / delta_t_secs # no time varying inputs
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#k_Crate_r_cyc = np.trapz(k_Crate_r_cyc, x=t_secs) / delta_t_secs # no time varying inputs
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#k_dod_r_cyc = np.trapz(k_dod_r_cyc, x=t_secs) / delta_t_secs # no time varying inputs
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# Calculate incremental state changes
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states = self.states
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# Capacity
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dq_LLI_t = update_sigmoid_state(states['qLoss_LLI_t'][-1], delta_t_days, q1, p['q2'], q3)
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dq_LLI_EFC = update_power_B_state(states['qLoss_LLI_EFC'][-1], delta_efc, q5, p['q6'])
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if delta_efc / delta_t_days > 2: # only evalaute if more than 2 full cycles per day
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dq_BreakIn_EFC = update_sigmoid_state(states['qLoss_BreakIn_EFC'][-1], delta_efc, q7, p['q8'], p['q9'])
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else:
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dq_BreakIn_EFC = 0
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# Resistance
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dr_LLI_t = k_temp_r_cal * k_soc_r_cal * delta_t_secs
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dr_LLI_EFC = k_Crate_r_cyc * k_dod_r_cyc * delta_efc / 100
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# Accumulate and store states
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dx = np.array([dq_LLI_t, dq_LLI_EFC, dq_BreakIn_EFC, dr_LLI_t, dr_LLI_EFC])
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for k, v in zip(states.keys(), dx):
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x = self.states[k][-1] + v
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self.states[k] = np.append(self.states[k], x)
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# Store stressors
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t_days = self.stressors['t_days'][-1] + delta_t_days
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efc = self.stressors['efc'][-1] + delta_efc
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stressors = np.array([delta_t_days, t_days, delta_efc, efc, np.mean(TdegK), np.mean(soc), np.mean(Ua), dod, Crate])
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for k, v in zip(self.stressors.keys(), stressors):
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self.stressors[k] = np.append(self.stressors[k], v)
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# Store rates
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rates = np.array([q1, q3, q5, q7, k_temp_r_cal * k_soc_r_cal, k_Crate_r_cyc * k_dod_r_cyc])
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for k, v in zip(self.rates.keys(), rates):
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self.rates[k] = np.append(self.rates[k], v)
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def __update_outputs(self):
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# Calculate outputs, based on current battery state
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states = self.states
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p = self._params_life
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# Capacity
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q_LLI_t = 1 - states['qLoss_LLI_t'][-1]
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q_LLI_EFC = 1 - states['qLoss_LLI_EFC'][-1]
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q_BreakIn_EFC = 1 - states['qLoss_BreakIn_EFC'][-1]
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q = 1 - states['qLoss_LLI_t'][-1] - states['qLoss_LLI_EFC'][-1] - states['qLoss_BreakIn_EFC'][-1]
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# Resistance
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r_LLI_t = 1 + states['rGain_LLI_t'][-1]
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r_LLI_EFC = 1 + states['rGain_LLI_EFC'][-1]
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r = 1 + states['rGain_LLI_t'][-1] + states['rGain_LLI_EFC'][-1]
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# Assemble output
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out = np.array([q, q_LLI_t, q_LLI_EFC, q_BreakIn_EFC, r, r_LLI_t, r_LLI_EFC])
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# Store results
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for k, v in zip(list(self.outputs.keys()), out):
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self.outputs[k] = np.append(self.outputs[k], v)
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def sigmoid(x, alpha, beta, gamma):
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return 2*alpha*(1/2 - 1/(1 + np.exp((beta*x)**gamma)))
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def skewnormpdf(x, skew, width):
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x_prime = (x-0.5)/width
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return 2 * stats.norm.pdf(x_prime) * stats.norm.cdf(skew * (x_prime))
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