def newtonpf(Ybus, Sbus, V0, pv, pq, ppci, options):
"""Solves the power flow using a full Newton's method.
Solves for bus voltages given the full system admittance matrix (for
all buses), the complex bus power injection vector (for all buses),
the initial vector of complex bus voltages, and column vectors with
the lists of bus indices for the swing bus, PV buses, and PQ buses,
respectively. The bus voltage vector contains the set point for
generator (including ref bus) buses, and the reference angle of the
swing bus, as well as an initial guess for remaining magnitudes and
angles.
@see: L{runpf}
@author: Ray Zimmerman (PSERC Cornell)
@author: Richard Lincoln
Modified by University of Kassel (Florian Schaefer) to use numba
"""
## options
tol = options['tolerance_kva'] * 1e-3
max_it = options["max_iteration"]
numba = options["numba"]
iwamoto = options["algorithm"] == "iwamoto_nr"
voltage_depend_loads = options["voltage_depend_loads"]
v_debug = options["v_debug"]
baseMVA = ppci['baseMVA']
bus = ppci['bus']
gen = ppci['gen']
## initialize
i = 0
V = V0
Va = angle(V)
Vm = abs(V)
dVa, dVm = None, None
if iwamoto:
dVm, dVa = zeros_like(Vm), zeros_like(Va)
if v_debug:
Vm_it = Vm.copy()
Va_it = Va.copy()
else:
Vm_it = None
Va_it = None
## set up indexing for updating V
pvpq = r_[pv, pq]
# generate lookup pvpq -> index pvpq (used in createJ)
pvpq_lookup = zeros(max(Ybus.indices) + 1, dtype=int)
pvpq_lookup[pvpq] = arange(len(pvpq))
# get jacobian function
createJ = get_fastest_jacobian_function(pvpq, pq, numba)
npv = len(pv)
npq = len(pq)
j1 = 0
j2 = npv ## j1:j2 - V angle of pv buses
j3 = j2
j4 = j2 + npq ## j3:j4 - V angle of pq buses
j5 = j4
j6 = j4 + npq ## j5:j6 - V mag of pq buses
## evaluate F(x0)
F = _evaluate_Fx(Ybus, V, Sbus, pv, pq)
converged = _check_for_convergence(F, tol)
Ybus = Ybus.tocsr()
J = None
## do Newton iterations
while (not converged and i < max_it):
## update iteration counter
i = i + 1
J = create_jacobian_matrix(Ybus, V, pvpq, pq, createJ, pvpq_lookup,
npv, npq, numba)
dx = -1 * spsolve(J, F)
## update voltage
if npv and not iwamoto:
Va[pv] = Va[pv] + dx[j1:j2]
if npq and not iwamoto:
Va[pq] = Va[pq] + dx[j3:j4]
Vm[pq] = Vm[pq] + dx[j5:j6]
# iwamoto multiplier to increase convergence
if iwamoto:
Vm, Va = _iwamoto_step(Ybus, J, F, dx, pvpq, pq, createJ,
pvpq_lookup, npv, npq, numba, dVa, dVm, Vm,
Va, pv, j1, j2, j3, j4, j5, j6)
V = Vm * exp(1j * Va)
Vm = abs(V) ## update Vm and Va again in case
Va = angle(V) ## we wrapped around with a negative Vm
if v_debug:
Vm_it = column_stack((Vm_it, Vm))
Va_it = column_stack((Va_it, Va))
if voltage_depend_loads:
Sbus = makeSbus(baseMVA, bus, gen, vm=Vm)
F = _evaluate_Fx(Ybus, V, Sbus, pv, pq)
converged = _check_for_convergence(F, tol)
return V, converged, i, J, Vm_it, Va_it
def newtonpf(Ybus, Sbus, V0, ref, pv, pq, ppci, options):
"""Solves the power flow using a full Newton's method.
Solves for bus voltages given the full system admittance matrix (for
all buses), the complex bus power injection vector (for all buses),
the initial vector of complex bus voltages, and column vectors with
the lists of bus indices for the swing bus, PV buses, and PQ buses,
respectively. The bus voltage vector contains the set point for
generator (including ref bus) buses, and the reference angle of the
swing bus, as well as an initial guess for remaining magnitudes and
angles.
@see: L{runpf}
@author: Ray Zimmerman (PSERC Cornell)
@author: Richard Lincoln
Modified by University of Kassel (Florian Schaefer) to use numba
"""
# options
tol = options['tolerance_mva']
max_it = options["max_iteration"]
numba = options["numba"]
iwamoto = options["algorithm"] == "iwamoto_nr"
voltage_depend_loads = options["voltage_depend_loads"]
dist_slack = options["distributed_slack"]
v_debug = options["v_debug"]
use_umfpack = options["use_umfpack"]
permc_spec = options["permc_spec"]
baseMVA = ppci['baseMVA']
bus = ppci['bus']
gen = ppci['gen']
slack_weights = bus[:, SL_FAC].astype(float64) ## contribution factors for distributed slack
# initialize
i = 0
V = V0
Va = angle(V)
Vm = abs(V)
dVa, dVm = None, None
if iwamoto:
dVm, dVa = zeros_like(Vm), zeros_like(Va)
if v_debug:
Vm_it = Vm.copy()
Va_it = Va.copy()
else:
Vm_it = None
Va_it = None
# set up indexing for updating V
if dist_slack and len(ref) > 1:
pv = r_[ref[1:], pv]
ref = ref[[0]]
pvpq = r_[pv, pq]
# reference buses are always at the top, no matter where they are in the grid (very confusing...)
# so in the refpvpq, the indices must be adjusted so that ref bus(es) starts with 0
# todo: is it possible to simplify the indices/lookups and make the code clearer?
# for columns: columns are in the normal order in Ybus; column numbers for J are reduced by 1 internally
refpvpq = r_[ref, pvpq]
# generate lookup pvpq -> index pvpq (used in createJ):
# shows for a given row from Ybus, which row in J it becomes
# e.g. the first row in J is a PV bus. If the first PV bus in Ybus is in the row 2, the index of the row in Jbus must be 0.
# pvpq_lookup will then have a 0 at the index 2
pvpq_lookup = zeros(max(Ybus.indices) + 1, dtype=int)
if dist_slack:
# slack bus is relevant for the function createJ_ds
pvpq_lookup[refpvpq] = arange(len(refpvpq))
else:
pvpq_lookup[pvpq] = arange(len(pvpq))
# get jacobian function
createJ = get_fastest_jacobian_function(pvpq, pq, numba, dist_slack)
nref = len(ref)
npv = len(pv)
npq = len(pq)
j1 = 0
j2 = npv # j1:j2 - V angle of pv buses
j3 = j2
j4 = j2 + npq # j3:j4 - V angle of pq buses
j5 = j4
j6 = j4 + npq # j5:j6 - V mag of pq buses
j7 = j6
j8 = j6 + nref # j7:j8 - slacks
# make initial guess for the slack
slack = (gen[:, PG].sum() - bus[:, PD].sum()) / baseMVA
# evaluate F(x0)
F = _evaluate_Fx(Ybus, V, Sbus, ref, pv, pq, slack_weights, dist_slack, slack)
converged = _check_for_convergence(F, tol)
Ybus = Ybus.tocsr()
J = None
# do Newton iterations
while (not converged and i < max_it):
# update iteration counter
i = i + 1
J = create_jacobian_matrix(Ybus, V, ref, refpvpq, pvpq, pq, createJ, pvpq_lookup, nref, npv, npq, numba, slack_weights, dist_slack)
dx = -1 * spsolve(J, F, permc_spec=permc_spec, use_umfpack=use_umfpack)
# update voltage
if npv and not iwamoto:
Va[pv] = Va[pv] + dx[j1:j2]
if npq and not iwamoto:
Va[pq] = Va[pq] + dx[j3:j4]
Vm[pq] = Vm[pq] + dx[j5:j6]
if dist_slack:
slack = slack + dx[j7:j8]
# iwamoto multiplier to increase convergence
if iwamoto:
Vm, Va = _iwamoto_step(Ybus, J, F, dx, pq, npv, npq, dVa, dVm, Vm, Va, pv, j1, j2, j3, j4, j5, j6)
V = Vm * exp(1j * Va)
Vm = abs(V) # update Vm and Va again in case
Va = angle(V) # we wrapped around with a negative Vm
if v_debug:
Vm_it = column_stack((Vm_it, Vm))
Va_it = column_stack((Va_it, Va))
if voltage_depend_loads:
Sbus = makeSbus(baseMVA, bus, gen, vm=Vm)
F = _evaluate_Fx(Ybus, V, Sbus, ref, pv, pq, slack_weights, dist_slack, slack)
converged = _check_for_convergence(F, tol)
return V, converged, i, J, Vm_it, Va_it
i = 0
V = V0
Va = np.angle(V)
Vm = abs(V)
pvpq = np.r_[pv, pq]
pvpq_lookup = np.zeros(max(Ybus.indices) + 1, dtype=int)
pvpq_lookup[pvpq] = np.arange(len(pvpq))
npv = len(pv)
npq = len(pq)
j1 = 0
j2 = npv # j1:j2 - V angle of pv buses
j3 = j2
j4 = j2 + npq # j3:j4 - V angle of pq buses
j5 = j4
j6 = j4 + npq # j5:j6 - V mag of pq buses
createJ = get_fastest_jacobian_function(pvpq, pq, numba)
# mimic the code
F = solver._evaluate_Fx(Ybus, V, Sbus, pv, pq)
converged = solver._check_for_convergence(F, tol)
while (not converged and i < max_it):
i = i + 1
J = solver.create_jacobian_matrix(Ybus, V, pq, pvpq)
# to test
J2_ = create_jacobian_matrix(Ybus, V, pvpq, pq, createJ, pvpq_lookup, npv, npq, numba)
J2 = sparse.csc_matrix(J2_)
J_pp_ = np.load("J_{}.npy".format(i))
J_pp = sparse.csc_matrix(J_pp_)
test2 = np.where(J2.toarray() != 0)