Move t-matrix op related stuff qpms_p.py->tmatrices.py

Former-commit-id: 4179c6e8fa960ade08ccac85e035bdc6a9bd16c0
2017-07-12 07:21:49 +03:00 · 2017-07-12 07:21:49 +03:00 · 3b6304b348
parent cc4815b861
commit 3b6304b348
2 changed files with 241 additions and 260 deletions
--- a/qpms/qpms_p.py
+++ b/qpms/qpms_p.py
@ -8,7 +8,6 @@ from scipy.special import lpmn, lpmv, sph_jn, sph_yn, poch, gammaln
 from scipy.misc import factorial
 import math
 import cmath
-import quaternion, spherical_functions as sf # because of the Wigner matrices. There imports are SLOW.

 """
 '''
@ -719,262 +718,3 @@ def G0_sum_1_slow(source_cart, dest_cart, k, nmax):
    return G_Mie_scat_precalc_cart(source_cart, dest_cart, RH, RV, a=0.001, nmax=nmax, k_i=1, k_e=k, μ_i=1, μ_e=1, J_ext=1, J_scat=3)


-
-# Transformations of spherical bases
-#@jit
-def WignerD_mm(l, quat):
-    """
-    Calculates Wigner D matrix (as an numpy (2*l+1,2*l+1)-shaped array) 
-    for order l, and a rotation given by quaternion quat.
-    
-    This represents the rotation of spherical vector basis
-    TODO doc
-    """
-    
-    indices = np.array([ [l,i,j] for i in range(-l,l+1) for j in range(-l,l+1)])
-    Delems = sf.Wigner_D_element(quat, indices).reshape(2*l+1,2*l+1)
-    return Delems
-
-#@jit
-def WignerD_mm_fromvector(l, vect):
-    """
-    TODO doc
-    """
-    return WignerD_mm(l, quaternion.from_rotation_vector(vect))
-
-
-#@jit
-def WignerD_yy(lmax, quat):
-    """
-    TODO doc
-    """
-    my, ny = get_mn_y(lmax)
-    Delems = np.zeros((len(my),len(my)),dtype=complex)
-    b_in = 0
-    e_in =  None
-    for l in range(1,lmax+1):
-        e_in = b_in + 2*l+1
-        Delems[b_in:e_in,b_in:e_in] = WignerD_mm(l, quat)
-        b_in = e_in
-    return Delems
-    
-#@jit
-def WignerD_yy_fromvector(lmax, vect):
-    """
-    TODO doc
-    """
-    return WignerD_yy(lmax, quaternion.from_rotation_vector(vect))
-
-
-#@jit
-def xflip_yy(lmax):
-    """
-    TODO doc
-    xflip = δ(m + m') δ(l - l')  
-    (i.e. ones on the (m' m) antidiagonal
-    """
-    my, ny = get_mn_y(lmax)
-    elems = np.zeros((len(my),len(my)),dtype=int)
-    b_in = 0
-    e_in =  None
-    for l in range(1,lmax+1):
-        e_in = b_in + 2*l+1
-        elems[b_in:e_in,b_in:e_in] = np.eye(2*l+1)[::-1,:]
-        b_in = e_in
-    return elems
-
-#@jit
-def xflip_tyy(lmax):
-    fl_yy = xflip_yy(lmax)
-    return np.array([fl_yy,-fl_yy])
-
-#@jit
-def xflip_tyty(lmax):
-    fl_yy = xflip_yy(lmax)
-    nelem = fl_yy.shape[0]
-    fl_tyty = np.zeros((2,nelem,2,nelem),dtype=int)
-    fl_tyty[0,:,0,:] = fl_yy
-    fl_tyty[1,:,1,:] = -fl_yy
-    return fl_tyty
-
-#@jit
-def yflip_yy(lmax):
-    """
-    TODO doc
-    yflip = rot(z,pi/2) * xflip * rot(z,-pi/2)
-          = δ(m + m') δ(l - l') * (-1)**m
-    """
-    my, ny = get_mn_y(lmax)
-    elems = xflip_yy(lmax)
-    elems[(my % 2)==1] = elems[(my % 2)==1] * -1 # Obvious sign of tiredness (this is correct but ugly; FIXME)
-    return elems
-
-#@jit
-def yflip_tyy(lmax):
-    fl_yy = yflip_yy(lmax)
-    return np.array([fl_yy,-fl_yy])
-
-#@jit
-def yflip_tyty(lmax):
-    fl_yy = yflip_yy(lmax)
-    nelem = fl_yy.shape[0]
-    fl_tyty = np.zeros((2,nelem,2,nelem),dtype=int)
-    fl_tyty[0,:,0,:] = fl_yy
-    fl_tyty[1,:,1,:] = -fl_yy
-    return fl_tyty
-
-#@jit
-def zflip_yy(lmax):
-    """
-    TODO doc
-    zflip = (-1)^(l+m)
-    """
-    my, ny = get_mn_y(lmax)
-    elems = np.zeros((len(my), len(my)), dtype=int)
-    b_in = 0
-    e_in = None
-    for l in range(1,lmax+1):
-        e_in = b_in + 2*l+1
-        elems[b_in:e_in,b_in:e_in] = np.diag([(-1)**i for i in range(e_in-b_in)])
-        b_in = e_in
-    return elems
-
-#@jit
-def zflip_tyy(lmax):
-    fl_yy = zflip_yy(lmax)
-    return np.array([fl_yy,-fl_yy])
-
-#@jit
-def zflip_tyty(lmax):
-    fl_yy = zflip_yy(lmax)
-    nelem = fl_yy.shape[0]
-    fl_tyty = np.zeros((2,nelem,2,nelem),dtype=int)
-    fl_tyty[0,:,0,:] = fl_yy
-    fl_tyty[1,:,1,:] = -fl_yy
-    return fl_tyty
-
-#@jit
-def parity_yy(lmax):
-    """
-    Parity operator (flip in x,y,z)
-    parity = (-1)**l
-    """
-    my, ny = get_mn_y(lmax)
-    return np.diag((-1)**ny)
-
-# BTW parity (xyz-flip) is simply (-1)**ny
-
-
-
-#----------------------------------------------------#
-# Loading T-matrices from scuff-tmatrix output files #
-#----------------------------------------------------#
-
-# We don't really need this particular function anymore, but...
-#@jit
-def _scuffTMatrixConvert_EM_01(EM):
-    #print(EM)
-    if (EM == b'E'):
-        return 0
-    elif (EM == b'M'):
-        return 1
-    else:
-        return None
-
-#@ujit
-def loadScuffTMatrices(fileName):
-    """
-    TODO doc
-    """
-    μm = 1e-6
-    table = np.genfromtxt(fileName, 
-                  converters={1: _scuffTMatrixConvert_EM_01, 4: _scuffTMatrixConvert_EM_01},
-                  dtype=[('freq', '<f8'), ('outc_type', '<i8'), ('outc_l', '<i8'), ('outc_m', '<i8'), 
-                         ('inc_type', '<i8'), ('inc_l', '<i8'), ('inc_m', '<i8'), ('Treal', '<f8'), ('Timag', '<f8')]
-                          )
-    lMax=np.max(table['outc_l'])
-    my,ny = get_mn_y(lMax)
-    nelem = len(ny)
-    TMatrix_sz = nelem**2 * 4 # number of rows for each frequency: nelem * nelem spherical incides, 2 * 2 E/M types
-    freqs_weirdunits = table['freq'][::TMatrix_sz].copy()
-    freqs = freqs_weirdunits * c / μm
-    # The iteration in the TMatrix file goes in this order (the last one iterates fastest, i.e. in the innermost loop):
-    # freq outc_l outc_m outc_type inc_l inc_m inc_type
-    # The l,m mapping is the same as is given by my get_mn_y function, so no need to touch that
-    TMatrices_tmp_real = table['Treal'].reshape(len(freqs), nelem, 2, nelem, 2)
-    TMatrices_tmp_imag = table['Timag'].reshape(len(freqs), nelem, 2, nelem, 2)
-    # There are two přoblems with the previous matrices. First, we want to have the
-    # type indices first, so we want a shape (len(freqs), 2, nelem, 2, nelem) as in the older code.
-    # Second, M-waves come first, so they have now 0-valued index, and E-waves have 1-valued index,
-    # which we want to be inverted.
-    TMatrices = np.zeros((len(freqs),2,nelem,2,nelem),dtype=complex)
-    for inc_type in [0,1]:
-        for outc_type in [0,1]:
-            TMatrices[:,1-outc_type,:,1-inc_type,:] = TMatrices_tmp_real[:,:,outc_type,:,inc_type]+1j*TMatrices_tmp_imag[:,:,outc_type,:,inc_type]
-    # IMPORTANT: now we are going from Reid's/Kristensson's/Jackson's/whoseever convention to Taylor's convention
-    TMatrices[:,:,:,:,:] = TMatrices[:,:,:,:,:] * np.sqrt(ny*(ny+1))[ň,ň,ň,ň,:] / np.sqrt(ny*(ny+1))[ň,ň,:,ň,ň]
-    return (TMatrices, freqs, freqs_weirdunits, lMax)
-
-
-# misc tensor maniputalion
-#@jit
-def apply_matrix_left(matrix, tensor, axis):
-    """
-    TODO doc
-    Apply square matrix to a given axis of a tensor, so that the result retains the shape
-    of the original tensor. The summation goes over the second index of the matrix and the
-    given tensor axis.
-    """
-    tmp = np.tensordot(matrix, tensor, axes=(-1,axis))
-    return np.moveaxis(tmp, 0, axis)
-
-#@jit
-def apply_ndmatrix_left(matrix,tensor,axes):
-    """
-    Generalized apply_matrix_left, the matrix can have more (2N) abstract dimensions,
-    like M[i,j,k,...z,i,j,k,...,z]. N axes have to be specified in a tuple, corresponding
-    to the axes 0,1,...N-1 of the matrix
-    """
-    N = len(axes)
-    matrix = np.tensordot(matrix, tensor, axes=([-N+axn for axn in range(N)],axes))
-    matrix = np.moveaxis(matrix, range(N), axes)
-    return matrix
-
-
-def symz_indexarrays(lMax, npart = 1):
-    """
-    Returns indices that are used for separating the in-plane E ('TE' in the photonic crystal
-    jargon) and perpendicular E ('TM' in the photonic crystal jargon) modes
-    in the z-mirror symmetric systems.
-
-    Parameters
-    ----------
-    lMax : int
-        The maximum degree cutoff for the T-matrix to which these indices will be applied.
-
-    npart : int
-        Number of particles (TODO better description)
-
-    Returns
-    -------
-    TEč, TMč : (npart * 2 * nelem)-shaped bool ndarray
-        Mask arrays corresponding to the 'TE' and 'TM' modes, respectively.
-    """
-    my, ny = get_mn_y(lMax)
-    nelem = len(my)
-    ž = np.arange(2*nelem) # single particle spherical wave indices
-    tž = ž // nelem # tž == 0: electric waves, tž == 1: magnetic waves
-    mž = my[ž%nelem]
-    nž = ny[ž%nelem]
-    TEž = ž[(mž+nž+tž) % 2 == 0]
-    TMž = ž[(mž+nž+tž) % 2 == 1]
-
-    č = np.arange(npart*2*nelem) # spherical wave indices for multiple particles (e.g. in a unit cell)
-    žč = č % (2* nelem)
-    tč = tž[žč]
-    mč = mž[žč]
-    nč = nž[žč]
-    TEč = č[(mč+nč+tč) % 2 == 0]
-    TMč = č[(mč+nč+tč) % 2 == 1]
-    return (TEč, TMč)
-
--- a/qpms/tmatrices.py
+++ b/qpms/tmatrices.py
@ -0,0 +1,241 @@
+import numpy as np
+import quaternion, spherical_functions as sf # because of the Wigner matrices. These imports are SLOW.
+
+# Transformations of spherical bases
+def WignerD_mm(l, quat):
+    """
+    Calculates Wigner D matrix (as an numpy (2*l+1,2*l+1)-shaped array) 
+    for order l, and a rotation given by quaternion quat.
+    
+    This represents the rotation of spherical vector basis
+    TODO doc
+    """
+    
+    indices = np.array([ [l,i,j] for i in range(-l,l+1) for j in range(-l,l+1)])
+    Delems = sf.Wigner_D_element(quat, indices).reshape(2*l+1,2*l+1)
+    return Delems
+
+def WignerD_mm_fromvector(l, vect):
+    """
+    TODO doc
+    """
+    return WignerD_mm(l, quaternion.from_rotation_vector(vect))
+
+
+def WignerD_yy(lmax, quat):
+    """
+    TODO doc
+    """
+    my, ny = get_mn_y(lmax)
+    Delems = np.zeros((len(my),len(my)),dtype=complex)
+    b_in = 0
+    e_in =  None
+    for l in range(1,lmax+1):
+        e_in = b_in + 2*l+1
+        Delems[b_in:e_in,b_in:e_in] = WignerD_mm(l, quat)
+        b_in = e_in
+    return Delems
+    
+def WignerD_yy_fromvector(lmax, vect):
+    """
+    TODO doc
+    """
+    return WignerD_yy(lmax, quaternion.from_rotation_vector(vect))
+
+def xflip_yy(lmax):
+    """
+    TODO doc
+    xflip = δ(m + m') δ(l - l')  
+    (i.e. ones on the (m' m) antidiagonal
+    """
+    my, ny = get_mn_y(lmax)
+    elems = np.zeros((len(my),len(my)),dtype=int)
+    b_in = 0
+    e_in =  None
+    for l in range(1,lmax+1):
+        e_in = b_in + 2*l+1
+        elems[b_in:e_in,b_in:e_in] = np.eye(2*l+1)[::-1,:]
+        b_in = e_in
+    return elems
+
+def xflip_tyy(lmax):
+    fl_yy = xflip_yy(lmax)
+    return np.array([fl_yy,-fl_yy])
+
+def xflip_tyty(lmax):
+    fl_yy = xflip_yy(lmax)
+    nelem = fl_yy.shape[0]
+    fl_tyty = np.zeros((2,nelem,2,nelem),dtype=int)
+    fl_tyty[0,:,0,:] = fl_yy
+    fl_tyty[1,:,1,:] = -fl_yy
+    return fl_tyty
+
+def yflip_yy(lmax):
+    """
+    TODO doc
+    yflip = rot(z,pi/2) * xflip * rot(z,-pi/2)
+          = δ(m + m') δ(l - l') * (-1)**m
+    """
+    my, ny = get_mn_y(lmax)
+    elems = xflip_yy(lmax)
+    elems[(my % 2)==1] = elems[(my % 2)==1] * -1 # Obvious sign of tiredness (this is correct but ugly; FIXME)
+    return elems
+
+def yflip_tyy(lmax):
+    fl_yy = yflip_yy(lmax)
+    return np.array([fl_yy,-fl_yy])
+
+def yflip_tyty(lmax):
+    fl_yy = yflip_yy(lmax)
+    nelem = fl_yy.shape[0]
+    fl_tyty = np.zeros((2,nelem,2,nelem),dtype=int)
+    fl_tyty[0,:,0,:] = fl_yy
+    fl_tyty[1,:,1,:] = -fl_yy
+    return fl_tyty
+
+def zflip_yy(lmax):
+    """
+    TODO doc
+    zflip = (-1)^(l+m)
+    """
+    my, ny = get_mn_y(lmax)
+    elems = np.zeros((len(my), len(my)), dtype=int)
+    b_in = 0
+    e_in = None
+    for l in range(1,lmax+1):
+        e_in = b_in + 2*l+1
+        elems[b_in:e_in,b_in:e_in] = np.diag([(-1)**i for i in range(e_in-b_in)])
+        b_in = e_in
+    return elems
+
+def zflip_tyy(lmax):
+    fl_yy = zflip_yy(lmax)
+    return np.array([fl_yy,-fl_yy])
+
+def zflip_tyty(lmax):
+    fl_yy = zflip_yy(lmax)
+    nelem = fl_yy.shape[0]
+    fl_tyty = np.zeros((2,nelem,2,nelem),dtype=int)
+    fl_tyty[0,:,0,:] = fl_yy
+    fl_tyty[1,:,1,:] = -fl_yy
+    return fl_tyty
+
+def parity_yy(lmax):
+    """
+    Parity operator (flip in x,y,z)
+    parity = (-1)**l
+    """
+    my, ny = get_mn_y(lmax)
+    return np.diag((-1)**ny)
+
+# BTW parity (xyz-flip) is simply (-1)**ny
+
+
+
+#----------------------------------------------------#
+# Loading T-matrices from scuff-tmatrix output files #
+#----------------------------------------------------#
+
+# We don't really need this particular function anymore, but...
+def _scuffTMatrixConvert_EM_01(EM):
+    #print(EM)
+    if (EM == b'E'):
+        return 0
+    elif (EM == b'M'):
+        return 1
+    else:
+        return None
+
+def loadScuffTMatrices(fileName):
+    """
+    TODO doc
+    """
+    μm = 1e-6
+    table = np.genfromtxt(fileName, 
+                  converters={1: _scuffTMatrixConvert_EM_01, 4: _scuffTMatrixConvert_EM_01},
+                  dtype=[('freq', '<f8'), ('outc_type', '<i8'), ('outc_l', '<i8'), ('outc_m', '<i8'), 
+                         ('inc_type', '<i8'), ('inc_l', '<i8'), ('inc_m', '<i8'), ('Treal', '<f8'), ('Timag', '<f8')]
+                          )
+    lMax=np.max(table['outc_l'])
+    my,ny = get_mn_y(lMax)
+    nelem = len(ny)
+    TMatrix_sz = nelem**2 * 4 # number of rows for each frequency: nelem * nelem spherical incides, 2 * 2 E/M types
+    freqs_weirdunits = table['freq'][::TMatrix_sz].copy()
+    freqs = freqs_weirdunits * c / μm
+    # The iteration in the TMatrix file goes in this order (the last one iterates fastest, i.e. in the innermost loop):
+    # freq outc_l outc_m outc_type inc_l inc_m inc_type
+    # The l,m mapping is the same as is given by my get_mn_y function, so no need to touch that
+    TMatrices_tmp_real = table['Treal'].reshape(len(freqs), nelem, 2, nelem, 2)
+    TMatrices_tmp_imag = table['Timag'].reshape(len(freqs), nelem, 2, nelem, 2)
+    # There are two přoblems with the previous matrices. First, we want to have the
+    # type indices first, so we want a shape (len(freqs), 2, nelem, 2, nelem) as in the older code.
+    # Second, M-waves come first, so they have now 0-valued index, and E-waves have 1-valued index,
+    # which we want to be inverted.
+    TMatrices = np.zeros((len(freqs),2,nelem,2,nelem),dtype=complex)
+    for inc_type in [0,1]:
+        for outc_type in [0,1]:
+            TMatrices[:,1-outc_type,:,1-inc_type,:] = TMatrices_tmp_real[:,:,outc_type,:,inc_type]+1j*TMatrices_tmp_imag[:,:,outc_type,:,inc_type]
+    # IMPORTANT: now we are going from Reid's/Kristensson's/Jackson's/whoseever convention to Taylor's convention
+    TMatrices[:,:,:,:,:] = TMatrices[:,:,:,:,:] * np.sqrt(ny*(ny+1))[ň,ň,ň,ň,:] / np.sqrt(ny*(ny+1))[ň,ň,:,ň,ň]
+    return (TMatrices, freqs, freqs_weirdunits, lMax)
+
+
+# misc tensor maniputalion
+def apply_matrix_left(matrix, tensor, axis):
+    """
+    TODO doc
+    Apply square matrix to a given axis of a tensor, so that the result retains the shape
+    of the original tensor. The summation goes over the second index of the matrix and the
+    given tensor axis.
+    """
+    tmp = np.tensordot(matrix, tensor, axes=(-1,axis))
+    return np.moveaxis(tmp, 0, axis)
+
+def apply_ndmatrix_left(matrix,tensor,axes):
+    """
+    Generalized apply_matrix_left, the matrix can have more (2N) abstract dimensions,
+    like M[i,j,k,...z,i,j,k,...,z]. N axes have to be specified in a tuple, corresponding
+    to the axes 0,1,...N-1 of the matrix
+    """
+    N = len(axes)
+    matrix = np.tensordot(matrix, tensor, axes=([-N+axn for axn in range(N)],axes))
+    matrix = np.moveaxis(matrix, range(N), axes)
+    return matrix
+
+
+def symz_indexarrays(lMax, npart = 1):
+    """
+    Returns indices that are used for separating the in-plane E ('TE' in the photonic crystal
+    jargon) and perpendicular E ('TM' in the photonic crystal jargon) modes
+    in the z-mirror symmetric systems.
+
+    Parameters
+    ----------
+    lMax : int
+        The maximum degree cutoff for the T-matrix to which these indices will be applied.
+
+    npart : int
+        Number of particles (TODO better description)
+
+    Returns
+    -------
+    TEč, TMč : (npart * 2 * nelem)-shaped bool ndarray
+        Mask arrays corresponding to the 'TE' and 'TM' modes, respectively.
+    """
+    my, ny = get_mn_y(lMax)
+    nelem = len(my)
+    ž = np.arange(2*nelem) # single particle spherical wave indices
+    tž = ž // nelem # tž == 0: electric waves, tž == 1: magnetic waves
+    mž = my[ž%nelem]
+    nž = ny[ž%nelem]
+    TEž = ž[(mž+nž+tž) % 2 == 0]
+    TMž = ž[(mž+nž+tž) % 2 == 1]
+
+    č = np.arange(npart*2*nelem) # spherical wave indices for multiple particles (e.g. in a unit cell)
+    žč = č % (2* nelem)
+    tč = tž[žč]
+    mč = mž[žč]
+    nč = nž[žč]
+    TEč = č[(mč+nč+tč) % 2 == 0]
+    TMč = č[(mč+nč+tč) % 2 == 1]
+    return (TEč, TMč)