# -*- coding: utf-8 -*-
# -------------------------------------------------------------------
# Filename: source.py
# Purpose: Computes and plots radiation patterns
# ---------------------------------------------------------------------
"""
Functions to compute and plot radiation patterns
:copyright:
The ObsPy Development Team (devs@obspy.org)
:license:
GNU Lesser General Public License, Version 3
(http://www.gnu.org/copyleft/lesser.html)
"""
from __future__ import (absolute_import, division, print_function,
unicode_literals)
from future.builtins import * # NOQA @UnusedWildImport
import numpy as np
from matplotlib.cm import get_cmap
from obspy.core.util import MATPLOTLIB_VERSION
from obspy.core.event.source import farfield
from obspy.imaging.scripts.mopad import MomentTensor, BeachBall
from obspy.imaging.mopad_wrapper import beach
[docs]def plot_radiation_pattern(
mt, kind=['p_sphere', 'beachball'], coordinate_system='RTP',
p_sphere_direction='inwards', fig=None, show=True):
"""
Plot the P/S farfield radiation pattern on a unit sphere grid.
The calculations are based on [Aki1980]_ eq. 4.29.
:param mt: Focal mechanism NM x 6 (M11, M22, M33, M12, M13, M23 - the
six independent components of the moment tensor, where the coordinate
system is 1,2,3 = Up,South,East which equals r,theta,phi -
Harvard/Global CMT convention). The relation to [Aki1980]_
x,y,z equals North,East,Down convention is as follows: Mrr=Mzz,
Mtt=Mxx, Mpp=Myy, Mrt=Mxz, Mrp=-Myz, Mtp=-Mxy.
:param kind: One of:
* **(A)** A list of strings or nested list of strings for a matplotlib
plot (for details see :meth:`obspy.core.event.event.Event.plot`).
* **(B)** ``"mayavi"``: uses the mayavi library.
* **(C)** ``"vtk"``: This vtk option writes two vtk files to the
current working directory. ``rpattern.vtk`` contains the p and s
wave farfield vector field. ``beachlines.vtk`` contains the nodal
lines of the radiation pattern. A vtk glyph filter should be applied
to the vector field (e.g. in ParaView) to visualize it.
:type fig: :class:`matplotlib.figure.Figure`
:param fig: Figure instance to use.
:type show: bool
:param show: Whether to show the figure after plotting or not. Can be
used to do further customization of the plot before showing it.
:returns: Matplotlib figure or ``None`` (if ``kind`` is ``"mayavi"`` or
``"vtk"``)
"""
import matplotlib.pyplot as plt
# reoorder all moment tensors to NED and RTP convention
# name : COMPONENT : NED sign and index
# NED : NN, EE, DD, NE, ND, ED : [0, 1, 2, 3, 4, 5]
# USE : UU, SS, EE, US, UE, SE : [1, 2, 0, -5, 3, -4]
# RTP : RR, TT, PP, RT, RP, TP : [1, 2, 0, -5, 3, -4]
# DSE : DD, SS, EE, DS, DE, SE : [1, 2, 0, -5, -3, 4]
if coordinate_system == 'RTP' or coordinate_system == 'USE':
signs = [1, 1, 1, -1, 1, -1]
indices = [1, 2, 0, 5, 3, 4]
ned_mt = [sign * mt[ind] for sign, ind in zip(signs, indices)]
rtp_mt = mt
# the moment tensor has to be converted to
# RTP/USE coordinates as well because the beachball routine relies
# on it.
# elif coordinate_system == 'DSE':
# signs = [1, 1, 1, -1, -1, 1]
# indices = [1, 2, 0, 5, 3, 4]
# ned_mt = [sign * mt[ind] for sign, ind in zip(signs, indices)]
# elif coordinate_system == 'NED':
# ned_mt = mt
else:
msg = 'moment tensor in {:s} coordinates not implemented yet'
raise NotImplementedError(msg.format(coordinate_system))
# matplotlib plotting is triggered when kind is a list of strings
if isinstance(kind, (list, tuple)):
fig, axes, kind = _setup_figure_and_axes(kind, fig=fig)
for ax, kind_ in zip(axes, kind):
if kind_ is None:
continue
elif kind_ == 'p_quiver':
_plot_radiation_pattern_quiver(ax, ned_mt, type="P")
elif kind_ == 'p_sphere':
_plot_radiation_pattern_sphere(
ax, ned_mt, type="P",
p_sphere_direction=p_sphere_direction)
elif kind_ == 's_quiver':
_plot_radiation_pattern_quiver(ax, ned_mt, type="S")
elif kind_ == 's_sphere':
_plot_radiation_pattern_sphere(ax, ned_mt, type="S")
elif kind_ == 'beachball':
ax.spines['left'].set_position('center')
ax.spines['right'].set_color('none')
ax.spines['bottom'].set_position('center')
ax.spines['top'].set_color('none')
_plot_beachball(ax, rtp_mt)
fig.tight_layout(pad=0.1)
if show:
plt.show()
return fig
elif kind == 'mayavi':
_plot_radiation_pattern_mayavi(ned_mt)
elif kind == 'vtk':
# this saves two files, one with the vector field and one
# with the nodal lines of the beachball
fname_rpattern = 'rpattern.vtk'
fname_beachlines = 'beachlines.vtk'
_write_radiation_pattern_vtk(
ned_mt, fname_rpattern=fname_rpattern,
fname_beachlines=fname_beachlines)
else:
raise NotImplementedError('{:s} not implemented yet'.format(kind))
[docs]def _plot_radiation_pattern_sphere(
ax3d, ned_mt, type, p_sphere_direction='inwards'):
"""
Private function that plots a radiation pattern sphere into an
:class:`~mpl_toolkits.mplot3d.axes3d.Axes3D`.
:type ax3d: :class:`mpl_toolkits.mplot3d.axes3d.Axes3D`
:param ax3d: matplotlib Axes3D object
:param ned_mt: moment tensor in NED convention
:param p_sphere_direction: If this is 'inwards', the tension regions of the
beachball deform the radiation sphere inwards. If 'outwards' it deforms
outwards.
:param type: 'P' or 'S' (P or S wave).
"""
import matplotlib.pyplot as plt
type = type.upper()
if type not in ("P", "S"):
msg = ("type must be 'P' or 'S'")
raise ValueError(msg)
is_p_wave = type == "P"
# generate spherical mesh that is aligned with the moment tensor null
# axis. MOPAD should use NED coordinate system to avoid internal
# coordinate transformations
mtensor = MomentTensor(ned_mt, system='NED')
# use the most isolated eigenvector as axis of symmetry
evecs = mtensor.get_eigvecs()
evals = np.abs(mtensor.get_eigvals())**2
evals_dev = np.abs(evals - np.mean(evals))
if is_p_wave:
if p_sphere_direction == 'outwards':
evec_max = evecs[np.argmax(evals_dev)]
elif p_sphere_direction == 'inwards':
evec_max = evecs[np.argmax(evals)]
else:
evec_max = evecs[np.argmax(evals_dev)]
orientation = np.ravel(evec_max)
# get a uv sphere that is oriented along the moment tensor axes
ntheta, nphi = 100, 100
points = _oriented_uv_sphere(ntheta=ntheta, nphi=nphi,
orientation=orientation)
sshape = (ntheta, nphi)
# get radiation pattern
if is_p_wave:
disp = farfield(ned_mt, points, type="P")
magn = np.sum(disp * points, axis=0)
cmap = get_cmap('bwr')
norm = plt.Normalize(-1, 1)
else:
disp = farfield(ned_mt, points, type="S")
magn = np.sqrt(np.sum(disp * disp, axis=0))
cmap = get_cmap('Greens')
norm = plt.Normalize(0, 1)
magn /= np.max(np.abs(magn))
# compute colours and displace points along normal
if is_p_wave:
if p_sphere_direction == 'outwards':
points *= (1. + np.abs(magn) / 2.)
elif p_sphere_direction == 'inwards':
points *= (1. + magn / 2.)
else:
points *= (1. + magn / 2.)
colors = np.array([cmap(norm(val)) for val in magn])
colors = colors.reshape(ntheta, nphi, 4)
x = points[0].reshape(sshape)
y = points[1].reshape(sshape)
z = points[2].reshape(sshape)
# plot 3d radiation pattern
ax3d.plot_surface(x, y, z, rstride=4, cstride=4, facecolors=colors)
ax3d.set(xlim=(-1.5, 1.5), ylim=(-1.5, 1.5), zlim=(-1.5, 1.5),
xticks=[-1, 1], yticks=[-1, 1], zticks=[-1, 1],
xticklabels=['South', 'North'],
yticklabels=['West', 'East'],
zticklabels=['Up', 'Down'],
title='{} wave farfield'.format(type))
ax3d.view_init(elev=-110., azim=0.)
[docs]def _plot_radiation_pattern_quiver(ax3d, ned_mt, type):
"""
Private routine that plots the wave farfield into an
:class:`~mpl_toolkits.mplot3d.axes3d.Axes3D` object
:type ax3d: :class:`mpl_toolkits.mplot3d.axes3d.Axes3D`
:param ax3d: matplotlib Axes3D object
:param ned_mt: the 6 comp moment tensor in NED orientation
:type type: str
:param type: 'P' or 'S' (P or S wave).
"""
import matplotlib.pyplot as plt
if MATPLOTLIB_VERSION < [1, 4]:
msg = ("Matplotlib 3D quiver plot needs matplotlib version >= 1.4.")
raise ImportError(msg)
type = type.upper()
if type not in ("P", "S"):
msg = ("type must be 'P' or 'S'")
raise ValueError(msg)
is_p_wave = type == "P"
# precompute even spherical grid and directional cosine array
points = _equalarea_spherical_grid(nlat=14)
if is_p_wave:
# get radiation pattern
disp = farfield(ned_mt, points, type="P")
# normalized magnitude:
magn = np.sum(disp * points, axis=0)
magn /= np.max(np.abs(magn))
cmap = get_cmap('bwr')
else:
# get radiation pattern
disp = farfield(ned_mt, points, type="S")
# normalized magnitude (positive only):
magn = np.sqrt(np.sum(disp * disp, axis=0))
magn /= np.max(np.abs(magn))
cmap = get_cmap('Greens')
# plot
# there is a mlab3d bug that quiver vector colors and lengths
# can only be changed if we plot each arrow independently
for loc, vec, mag in zip(points.T, disp.T, magn.T):
norm = plt.Normalize(-1., 1.)
color = cmap(norm(mag))
if is_p_wave:
loc *= (1. + mag / 2.)
length = abs(mag) / 2.0
else:
length = abs(mag) / 5.0
ax3d.quiver(loc[0], loc[1], loc[2], vec[0], vec[1], vec[2],
length=length, color=color)
ax3d.set(xlim=(-1.5, 1.5), ylim=(-1.5, 1.5), zlim=(-1.5, 1.5),
xticks=[-1, 1], yticks=[-1, 1], zticks=[-1, 1],
xticklabels=['South', 'North'],
yticklabels=['West', 'East'],
zticklabels=['Up', 'Down'],
title='{} wave farfield'.format(type))
ax3d.view_init(elev=-110., azim=0.)
[docs]def _plot_beachball(ax2d, rtp_mt):
"""
Private function that plots a beachball into a 2d matplotlib
:class:`~matplotlib.axes.Axes`.
:type ax2d: :class:`matplotlib.axes.Axes`
:param ax2d: 2d matplotlib Axes
:param ax2d: matplotlib Axes3D object
:param rtp_mt: moment tensor in RTP convention
"""
import matplotlib.pyplot as plt
norm = plt.Normalize(-1., 1.)
cmap = get_cmap('bwr')
bball = beach(rtp_mt, xy=(0, 0), width=50, facecolor=cmap(norm(0.7)),
bgcolor=cmap(norm(-0.7)))
ax2d.add_collection(bball)
ax2d.set(xlim=(-50, 50), ylim=(-50, 50),
xticks=(-40, 40), yticks=(-40, 40),
xticklabels=('West', 'East'),
yticklabels=('South', 'North'),
title='lower hemisphere stereographical projection')
[docs]def _plot_radiation_pattern_mayavi(ned_mt):
"""
Plot the radiation pattern using MayaVi.
This private function uses the mayavi (vtk) library to plot the radiation
pattern to screen. Note that you might have to set the QT_API environmental
variable to e.g. export QT_API=pyqt that mayavi works properly.
:param ned_mt: moment tensor in NED convention
"""
# use mayavi if possible.
try:
from mayavi import mlab
except Exception as err:
print(err)
msg = ("ObsPy failed to import MayaVi. "
"You need to install the mayavi module "
"(e.g. 'conda install mayavi', 'pip install mayavi'). "
"If it is installed and still doesn't work, "
"try setting the environmental variable QT_API to "
"pyqt (e.g. export QT_API=pyqt) before running the "
"code. Another option is to avoid mayavi and "
"directly use kind='vtk' for vtk file output of the "
"radiation pattern that can be used by external "
"software like ParaView")
raise ImportError(msg)
# get mopad moment tensor
mopad_mt = MomentTensor(ned_mt, system='NED')
bb = BeachBall(mopad_mt, npoints=200)
bb._setup_BB(unit_circle=False)
# extract the coordinates of the nodal lines
neg_nodalline = bb._nodalline_negative
pos_nodalline = bb._nodalline_positive
# add the first point to the end to close the nodal line
neg_nodalline = np.hstack((neg_nodalline, neg_nodalline[:, 0][:, None]))
pos_nodalline = np.hstack((pos_nodalline, pos_nodalline[:, 0][:, None]))
# plot radiation pattern and nodal lines
points = _equalarea_spherical_grid(nlat=20)
dispp = farfield(ned_mt, points, type="P")
disps = farfield(ned_mt, points, type="S")
# get vector lengths
normp = np.sum(dispp * points, axis=0)
normp /= np.max(np.abs(normp))
norms = np.sqrt(np.sum(disps * disps, axis=0))
norms /= np.max(np.abs(norms))
# make sphere to block view to the other side of the beachball
rad = 0.8
pi = np.pi
cos = np.cos
sin = np.sin
phi, theta = np.mgrid[0:pi:101j, 0:2 * pi:101j]
x = rad * sin(phi) * cos(theta)
y = rad * sin(phi) * sin(theta)
z = rad * cos(phi)
# p wave radiation pattern
mlab.figure(size=(800, 800), bgcolor=(0, 0, 0))
pts1 = mlab.quiver3d(points[0], points[1], points[2],
dispp[0], dispp[1], dispp[2],
scalars=normp, vmin=-1., vmax=1.)
pts1.glyph.color_mode = 'color_by_scalar'
mlab.plot3d(*neg_nodalline, color=(0, 0.5, 0), tube_radius=0.01)
mlab.plot3d(*pos_nodalline, color=(0, 0.5, 0), tube_radius=0.01)
mlab.mesh(x, y, z, color=(0, 0, 0))
# s wave radiation pattern
mlab.figure(size=(800, 800), bgcolor=(0, 0, 0))
pts2 = mlab.quiver3d(points[0], points[1], points[2],
disps[0], disps[1], disps[2], scalars=norms,
vmin=-0., vmax=1.)
pts2.glyph.color_mode = 'color_by_scalar'
mlab.plot3d(*neg_nodalline, color=(0, 0.5, 0), tube_radius=0.01)
mlab.plot3d(*pos_nodalline, color=(0, 0.5, 0), tube_radius=0.01)
mlab.mesh(x, y, z, color=(0, 0, 0))
mlab.show()
[docs]def _write_radiation_pattern_vtk(
ned_mt, fname_rpattern='rpattern.vtk',
fname_beachlines='beachlines.vtk'):
# output a vtkfile that can for exampled be displayed by ParaView
mtensor = MomentTensor(ned_mt, system='NED')
bb = BeachBall(mtensor, npoints=200)
bb._setup_BB(unit_circle=False)
# extract the coordinates of the nodal lines
neg_nodalline = bb._nodalline_negative
pos_nodalline = bb._nodalline_positive
# plot radiation pattern and nodal lines
points = _equalarea_spherical_grid()
ndim, npoints = points.shape
dispp = farfield(ned_mt, points, type="P")
disps = farfield(ned_mt, points, type="S")
# write vector field
with open(fname_rpattern, 'w') as vtk_file:
vtk_header = '# vtk DataFile Version 2.0\n' + \
'radiation pattern vector field\n' + \
'ASCII\n' + \
'DATASET UNSTRUCTURED_GRID\n' + \
'POINTS {:d} float\n'.format(npoints)
vtk_file.write(vtk_header)
# write point locations
for x, y, z in np.transpose(points):
vtk_file.write('{:.3e} {:.3e} {:.3e}\n'.format(x, y, z))
# write vector field
vtk_file.write('POINT_DATA {:d}\n'.format(npoints))
vtk_file.write('VECTORS s_radiation float\n')
for x, y, z in np.transpose(disps):
vtk_file.write('{:.3e} {:.3e} {:.3e}\n'.format(x, y, z))
vtk_file.write('VECTORS p_radiation float\n'.format(npoints))
for x, y, z in np.transpose(dispp):
vtk_file.write('{:.3e} {:.3e} {:.3e}\n'.format(x, y, z))
# write nodal lines
with open(fname_beachlines, 'w') as vtk_file:
npts_neg = neg_nodalline.shape[1]
npts_pos = pos_nodalline.shape[1]
npts_tot = npts_neg + npts_pos
vtk_header = '# vtk DataFile Version 2.0\n' + \
'beachball nodal lines\n' + \
'ASCII\n' + \
'DATASET UNSTRUCTURED_GRID\n' + \
'POINTS {:d} float\n'.format(npts_tot)
vtk_file.write(vtk_header)
# write point locations
for x, y, z in np.transpose(neg_nodalline):
vtk_file.write('{:.3e} {:.3e} {:.3e}\n'.format(x, y, z))
for x, y, z in np.transpose(pos_nodalline):
vtk_file.write('{:.3e} {:.3e} {:.3e}\n'.format(x, y, z))
# write line segments
vtk_file.write('\nCELLS 2 {:d}\n'.format(npts_tot + 4))
ipoints = list(range(0, npts_neg)) + [0]
vtk_file.write('{:d} '.format(npts_neg + 1))
for ipoint in ipoints:
if ipoint % 30 == 29:
vtk_file.write('\n')
vtk_file.write('{:d} '.format(ipoint))
vtk_file.write('\n')
ipoints = list(range(0, npts_pos)) + [0]
vtk_file.write('{:d} '.format(npts_pos + 1))
for ipoint in ipoints:
if ipoint % 30 == 29:
vtk_file.write('\n')
vtk_file.write('{:d} '.format(ipoint + npts_neg))
vtk_file.write('\n')
# cell types. 4 means cell type is a poly_line
vtk_file.write('\nCELL_TYPES 2\n')
vtk_file.write('4\n4')
# ===== SUPPORT FUNCTIONS FOR SPHERICAL MESHES ETC STARTING HERE:
[docs]def _oriented_uv_sphere(ntheta=100, nphi=100, orientation=[0., 0., 1.]):
"""
Returns a uv sphere (equidistant lat/lon grid) with its north-pole rotated
to the input axis. It returns the spherical grid points that can be used to
generate a QuadMesh on the sphere for surface plotting.
:param nlat: number of latitudinal grid points (default = 100)
:param nphi: number of longitudinal grid points (default = 100)
:param orientation: axis of the north-pole of the sphere
(default = [0, 0, 1])
"""
# make rotation matrix (after numpy mailing list)
zaxis = np.array([0., 0., 1.])
raxis = np.cross(orientation, zaxis) # rotate z axis to null
raxis_norm = np.linalg.norm(raxis)
if raxis_norm < 1e-10: # check for zero or 180 degree rotation
rotmtx = np.eye(3, dtype=np.float64)
else:
raxis /= raxis_norm
# angle between z and null
angle = np.arccos(np.dot(zaxis, orientation))
eye = np.eye(3, dtype=np.float64)
raxis2 = np.outer(raxis, raxis)
skew = np.array([[0, raxis[2], -raxis[1]],
[-raxis[2], 0, raxis[0]],
[raxis[1], -raxis[0], 0]])
rotmtx = (raxis2 + np.cos(angle) * (eye - raxis2) +
np.sin(angle) * skew)
# make uv sphere that is aligned with z-axis
ntheta, nphi = 100, 100
u = np.linspace(0, 2 * np.pi, nphi)
v = np.linspace(0, np.pi, ntheta)
x = np.outer(np.cos(u), np.sin(v))
y = np.outer(np.sin(u), np.sin(v))
z = np.outer(np.ones(np.size(u)), np.cos(v))
# ravel point array and rotate them to the null axis
points = np.vstack((x.flatten(), y.flatten(), z.flatten()))
points = np.dot(rotmtx, points)
return points
[docs]def _equalarea_spherical_grid(nlat=30):
"""
Generates a simple spherical equalarea grid that adjust the number of
longitude samples to the latitude. This grid is useful to plot vectors on
the sphere but not surfaces.
:param nlat: number of nodes in lat direction. The number of
nodes in lon direction is 2*nlat+1 at the equator
"""
ndim = 3
colats = np.linspace(0., np.pi, nlat)
norms = np.sin(colats)
# Scale number of point with latitude.
nlons = (2 * nlat * norms + 1).astype(np.int_)
# make colat/lon grid
colatgrid, longrid = [], []
for ilat in range(nlat):
nlon = nlons[ilat]
dlon = 2. * np.pi / nlon
lons = np.linspace(0. + dlon / 2., 2. * np.pi - dlon / 2., nlon)
for ilon in range(nlon):
colatgrid.append(colats[ilat])
longrid.append(lons[ilon])
npoints = len(longrid)
# get cartesian coordinates of spherical grid
points = np.empty((ndim, npoints))
points[0] = np.sin(colatgrid) * np.cos(longrid)
points[1] = np.sin(colatgrid) * np.sin(longrid)
points[2] = np.cos(colatgrid)
return points
if __name__ == '__main__':
import doctest
doctest.testmod(exclude_empty=True)