444 lines
15 KiB
Python
444 lines
15 KiB
Python
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__all__ = ['Linearizer']
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from sympy.core.backend import Matrix, eye, zeros
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from sympy.core.symbol import Dummy
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from sympy.utilities.iterables import flatten
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from sympy.physics.vector import dynamicsymbols
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from sympy.physics.mechanics.functions import msubs
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from collections import namedtuple
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from collections.abc import Iterable
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class Linearizer:
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"""This object holds the general model form for a dynamic system.
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This model is used for computing the linearized form of the system,
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while properly dealing with constraints leading to dependent
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coordinates and speeds.
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Attributes
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==========
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f_0, f_1, f_2, f_3, f_4, f_c, f_v, f_a : Matrix
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Matrices holding the general system form.
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q, u, r : Matrix
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Matrices holding the generalized coordinates, speeds, and
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input vectors.
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q_i, u_i : Matrix
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Matrices of the independent generalized coordinates and speeds.
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q_d, u_d : Matrix
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Matrices of the dependent generalized coordinates and speeds.
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perm_mat : Matrix
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Permutation matrix such that [q_ind, u_ind]^T = perm_mat*[q, u]^T
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"""
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def __init__(self, f_0, f_1, f_2, f_3, f_4, f_c, f_v, f_a, q, u,
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q_i=None, q_d=None, u_i=None, u_d=None, r=None, lams=None):
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"""
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Parameters
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==========
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f_0, f_1, f_2, f_3, f_4, f_c, f_v, f_a : array_like
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System of equations holding the general system form.
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Supply empty array or Matrix if the parameter
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does not exist.
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q : array_like
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The generalized coordinates.
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u : array_like
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The generalized speeds
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q_i, u_i : array_like, optional
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The independent generalized coordinates and speeds.
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q_d, u_d : array_like, optional
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The dependent generalized coordinates and speeds.
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r : array_like, optional
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The input variables.
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lams : array_like, optional
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The lagrange multipliers
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"""
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# Generalized equation form
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self.f_0 = Matrix(f_0)
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self.f_1 = Matrix(f_1)
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self.f_2 = Matrix(f_2)
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self.f_3 = Matrix(f_3)
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self.f_4 = Matrix(f_4)
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self.f_c = Matrix(f_c)
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self.f_v = Matrix(f_v)
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self.f_a = Matrix(f_a)
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# Generalized equation variables
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self.q = Matrix(q)
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self.u = Matrix(u)
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none_handler = lambda x: Matrix(x) if x else Matrix()
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self.q_i = none_handler(q_i)
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self.q_d = none_handler(q_d)
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self.u_i = none_handler(u_i)
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self.u_d = none_handler(u_d)
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self.r = none_handler(r)
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self.lams = none_handler(lams)
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# Derivatives of generalized equation variables
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self._qd = self.q.diff(dynamicsymbols._t)
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self._ud = self.u.diff(dynamicsymbols._t)
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# If the user doesn't actually use generalized variables, and the
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# qd and u vectors have any intersecting variables, this can cause
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# problems. We'll fix this with some hackery, and Dummy variables
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dup_vars = set(self._qd).intersection(self.u)
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self._qd_dup = Matrix([var if var not in dup_vars else Dummy()
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for var in self._qd])
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# Derive dimesion terms
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l = len(self.f_c)
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m = len(self.f_v)
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n = len(self.q)
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o = len(self.u)
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s = len(self.r)
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k = len(self.lams)
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dims = namedtuple('dims', ['l', 'm', 'n', 'o', 's', 'k'])
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self._dims = dims(l, m, n, o, s, k)
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self._Pq = None
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self._Pqi = None
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self._Pqd = None
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self._Pu = None
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self._Pui = None
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self._Pud = None
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self._C_0 = None
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self._C_1 = None
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self._C_2 = None
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self.perm_mat = None
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self._setup_done = False
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def _setup(self):
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# Calculations here only need to be run once. They are moved out of
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# the __init__ method to increase the speed of Linearizer creation.
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self._form_permutation_matrices()
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self._form_block_matrices()
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self._form_coefficient_matrices()
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self._setup_done = True
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def _form_permutation_matrices(self):
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"""Form the permutation matrices Pq and Pu."""
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# Extract dimension variables
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l, m, n, o, s, k = self._dims
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# Compute permutation matrices
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if n != 0:
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self._Pq = permutation_matrix(self.q, Matrix([self.q_i, self.q_d]))
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if l > 0:
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self._Pqi = self._Pq[:, :-l]
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self._Pqd = self._Pq[:, -l:]
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else:
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self._Pqi = self._Pq
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self._Pqd = Matrix()
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if o != 0:
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self._Pu = permutation_matrix(self.u, Matrix([self.u_i, self.u_d]))
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if m > 0:
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self._Pui = self._Pu[:, :-m]
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self._Pud = self._Pu[:, -m:]
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else:
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self._Pui = self._Pu
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self._Pud = Matrix()
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# Compute combination permutation matrix for computing A and B
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P_col1 = Matrix([self._Pqi, zeros(o + k, n - l)])
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P_col2 = Matrix([zeros(n, o - m), self._Pui, zeros(k, o - m)])
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if P_col1:
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if P_col2:
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self.perm_mat = P_col1.row_join(P_col2)
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else:
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self.perm_mat = P_col1
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else:
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self.perm_mat = P_col2
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def _form_coefficient_matrices(self):
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"""Form the coefficient matrices C_0, C_1, and C_2."""
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# Extract dimension variables
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l, m, n, o, s, k = self._dims
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# Build up the coefficient matrices C_0, C_1, and C_2
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# If there are configuration constraints (l > 0), form C_0 as normal.
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# If not, C_0 is I_(nxn). Note that this works even if n=0
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if l > 0:
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f_c_jac_q = self.f_c.jacobian(self.q)
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self._C_0 = (eye(n) - self._Pqd * (f_c_jac_q *
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self._Pqd).LUsolve(f_c_jac_q)) * self._Pqi
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else:
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self._C_0 = eye(n)
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# If there are motion constraints (m > 0), form C_1 and C_2 as normal.
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# If not, C_1 is 0, and C_2 is I_(oxo). Note that this works even if
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# o = 0.
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if m > 0:
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f_v_jac_u = self.f_v.jacobian(self.u)
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temp = f_v_jac_u * self._Pud
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if n != 0:
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f_v_jac_q = self.f_v.jacobian(self.q)
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self._C_1 = -self._Pud * temp.LUsolve(f_v_jac_q)
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else:
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self._C_1 = zeros(o, n)
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self._C_2 = (eye(o) - self._Pud *
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temp.LUsolve(f_v_jac_u)) * self._Pui
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else:
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self._C_1 = zeros(o, n)
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self._C_2 = eye(o)
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def _form_block_matrices(self):
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"""Form the block matrices for composing M, A, and B."""
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# Extract dimension variables
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l, m, n, o, s, k = self._dims
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# Block Matrix Definitions. These are only defined if under certain
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# conditions. If undefined, an empty matrix is used instead
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if n != 0:
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self._M_qq = self.f_0.jacobian(self._qd)
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self._A_qq = -(self.f_0 + self.f_1).jacobian(self.q)
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else:
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self._M_qq = Matrix()
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self._A_qq = Matrix()
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if n != 0 and m != 0:
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self._M_uqc = self.f_a.jacobian(self._qd_dup)
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self._A_uqc = -self.f_a.jacobian(self.q)
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else:
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self._M_uqc = Matrix()
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self._A_uqc = Matrix()
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if n != 0 and o - m + k != 0:
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self._M_uqd = self.f_3.jacobian(self._qd_dup)
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self._A_uqd = -(self.f_2 + self.f_3 + self.f_4).jacobian(self.q)
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else:
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self._M_uqd = Matrix()
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self._A_uqd = Matrix()
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if o != 0 and m != 0:
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self._M_uuc = self.f_a.jacobian(self._ud)
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self._A_uuc = -self.f_a.jacobian(self.u)
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else:
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self._M_uuc = Matrix()
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self._A_uuc = Matrix()
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if o != 0 and o - m + k != 0:
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self._M_uud = self.f_2.jacobian(self._ud)
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self._A_uud = -(self.f_2 + self.f_3).jacobian(self.u)
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else:
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self._M_uud = Matrix()
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self._A_uud = Matrix()
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if o != 0 and n != 0:
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self._A_qu = -self.f_1.jacobian(self.u)
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else:
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self._A_qu = Matrix()
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if k != 0 and o - m + k != 0:
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self._M_uld = self.f_4.jacobian(self.lams)
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else:
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self._M_uld = Matrix()
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if s != 0 and o - m + k != 0:
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self._B_u = -self.f_3.jacobian(self.r)
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else:
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self._B_u = Matrix()
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def linearize(self, op_point=None, A_and_B=False, simplify=False):
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"""Linearize the system about the operating point. Note that
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q_op, u_op, qd_op, ud_op must satisfy the equations of motion.
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These may be either symbolic or numeric.
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Parameters
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==========
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op_point : dict or iterable of dicts, optional
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Dictionary or iterable of dictionaries containing the operating
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point conditions. These will be substituted in to the linearized
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system before the linearization is complete. Leave blank if you
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want a completely symbolic form. Note that any reduction in
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symbols (whether substituted for numbers or expressions with a
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common parameter) will result in faster runtime.
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A_and_B : bool, optional
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If A_and_B=False (default), (M, A, B) is returned for forming
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[M]*[q, u]^T = [A]*[q_ind, u_ind]^T + [B]r. If A_and_B=True,
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(A, B) is returned for forming dx = [A]x + [B]r, where
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x = [q_ind, u_ind]^T.
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simplify : bool, optional
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Determines if returned values are simplified before return.
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For large expressions this may be time consuming. Default is False.
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Potential Issues
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================
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Note that the process of solving with A_and_B=True is
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computationally intensive if there are many symbolic parameters.
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For this reason, it may be more desirable to use the default
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A_and_B=False, returning M, A, and B. More values may then be
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substituted in to these matrices later on. The state space form can
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then be found as A = P.T*M.LUsolve(A), B = P.T*M.LUsolve(B), where
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P = Linearizer.perm_mat.
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"""
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# Run the setup if needed:
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if not self._setup_done:
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self._setup()
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# Compose dict of operating conditions
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if isinstance(op_point, dict):
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op_point_dict = op_point
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elif isinstance(op_point, Iterable):
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op_point_dict = {}
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for op in op_point:
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op_point_dict.update(op)
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else:
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op_point_dict = {}
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# Extract dimension variables
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l, m, n, o, s, k = self._dims
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# Rename terms to shorten expressions
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M_qq = self._M_qq
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M_uqc = self._M_uqc
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M_uqd = self._M_uqd
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M_uuc = self._M_uuc
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M_uud = self._M_uud
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M_uld = self._M_uld
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A_qq = self._A_qq
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A_uqc = self._A_uqc
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A_uqd = self._A_uqd
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A_qu = self._A_qu
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A_uuc = self._A_uuc
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A_uud = self._A_uud
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B_u = self._B_u
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C_0 = self._C_0
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C_1 = self._C_1
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C_2 = self._C_2
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# Build up Mass Matrix
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# |M_qq 0_nxo 0_nxk|
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# M = |M_uqc M_uuc 0_mxk|
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# |M_uqd M_uud M_uld|
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if o != 0:
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col2 = Matrix([zeros(n, o), M_uuc, M_uud])
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if k != 0:
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col3 = Matrix([zeros(n + m, k), M_uld])
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if n != 0:
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col1 = Matrix([M_qq, M_uqc, M_uqd])
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if o != 0 and k != 0:
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M = col1.row_join(col2).row_join(col3)
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elif o != 0:
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M = col1.row_join(col2)
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else:
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M = col1
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elif k != 0:
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M = col2.row_join(col3)
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else:
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M = col2
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M_eq = msubs(M, op_point_dict)
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# Build up state coefficient matrix A
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# |(A_qq + A_qu*C_1)*C_0 A_qu*C_2|
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# A = |(A_uqc + A_uuc*C_1)*C_0 A_uuc*C_2|
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# |(A_uqd + A_uud*C_1)*C_0 A_uud*C_2|
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# Col 1 is only defined if n != 0
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if n != 0:
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r1c1 = A_qq
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if o != 0:
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r1c1 += (A_qu * C_1)
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r1c1 = r1c1 * C_0
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if m != 0:
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r2c1 = A_uqc
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if o != 0:
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r2c1 += (A_uuc * C_1)
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r2c1 = r2c1 * C_0
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else:
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r2c1 = Matrix()
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if o - m + k != 0:
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r3c1 = A_uqd
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if o != 0:
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r3c1 += (A_uud * C_1)
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r3c1 = r3c1 * C_0
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else:
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r3c1 = Matrix()
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col1 = Matrix([r1c1, r2c1, r3c1])
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else:
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col1 = Matrix()
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# Col 2 is only defined if o != 0
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if o != 0:
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if n != 0:
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r1c2 = A_qu * C_2
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else:
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r1c2 = Matrix()
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if m != 0:
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r2c2 = A_uuc * C_2
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else:
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r2c2 = Matrix()
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if o - m + k != 0:
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r3c2 = A_uud * C_2
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else:
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r3c2 = Matrix()
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col2 = Matrix([r1c2, r2c2, r3c2])
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else:
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col2 = Matrix()
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if col1:
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if col2:
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Amat = col1.row_join(col2)
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else:
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Amat = col1
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else:
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Amat = col2
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Amat_eq = msubs(Amat, op_point_dict)
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# Build up the B matrix if there are forcing variables
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# |0_(n + m)xs|
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# B = |B_u |
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if s != 0 and o - m + k != 0:
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Bmat = zeros(n + m, s).col_join(B_u)
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Bmat_eq = msubs(Bmat, op_point_dict)
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else:
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Bmat_eq = Matrix()
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# kwarg A_and_B indicates to return A, B for forming the equation
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# dx = [A]x + [B]r, where x = [q_indnd, u_indnd]^T,
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if A_and_B:
|
||
|
A_cont = self.perm_mat.T * M_eq.LUsolve(Amat_eq)
|
||
|
if Bmat_eq:
|
||
|
B_cont = self.perm_mat.T * M_eq.LUsolve(Bmat_eq)
|
||
|
else:
|
||
|
# Bmat = Matrix([]), so no need to sub
|
||
|
B_cont = Bmat_eq
|
||
|
if simplify:
|
||
|
A_cont.simplify()
|
||
|
B_cont.simplify()
|
||
|
return A_cont, B_cont
|
||
|
# Otherwise return M, A, B for forming the equation
|
||
|
# [M]dx = [A]x + [B]r, where x = [q, u]^T
|
||
|
else:
|
||
|
if simplify:
|
||
|
M_eq.simplify()
|
||
|
Amat_eq.simplify()
|
||
|
Bmat_eq.simplify()
|
||
|
return M_eq, Amat_eq, Bmat_eq
|
||
|
|
||
|
|
||
|
def permutation_matrix(orig_vec, per_vec):
|
||
|
"""Compute the permutation matrix to change order of
|
||
|
orig_vec into order of per_vec.
|
||
|
|
||
|
Parameters
|
||
|
==========
|
||
|
|
||
|
orig_vec : array_like
|
||
|
Symbols in original ordering.
|
||
|
per_vec : array_like
|
||
|
Symbols in new ordering.
|
||
|
|
||
|
Returns
|
||
|
=======
|
||
|
|
||
|
p_matrix : Matrix
|
||
|
Permutation matrix such that orig_vec == (p_matrix * per_vec).
|
||
|
"""
|
||
|
if not isinstance(orig_vec, (list, tuple)):
|
||
|
orig_vec = flatten(orig_vec)
|
||
|
if not isinstance(per_vec, (list, tuple)):
|
||
|
per_vec = flatten(per_vec)
|
||
|
if set(orig_vec) != set(per_vec):
|
||
|
raise ValueError("orig_vec and per_vec must be the same length, " +
|
||
|
"and contain the same symbols.")
|
||
|
ind_list = [orig_vec.index(i) for i in per_vec]
|
||
|
p_matrix = zeros(len(orig_vec))
|
||
|
for i, j in enumerate(ind_list):
|
||
|
p_matrix[i, j] = 1
|
||
|
return p_matrix
|