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cmb_modules.py
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cmb_modules.py
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import numpy as np
import matplotlib
import sys
import matplotlib.cm as cm
import matplotlib.mlab as mlab
import matplotlib.pyplot as plt
import astropy.io.fits as fits
def make_CMB_T_map(N,pix_size,ell,DlTT):
"makes a realization of a simulated CMB sky map given an input DlTT as a function of ell,"
"the pixel size (pix_size) required and the number N of pixels in the linear dimension."
#np.random.seed(100)
# convert Dl to Cl
ClTT = DlTT * 2 * np.pi / (ell*(ell+1.))
ClTT[0] = 0. # set the monopole and the dipole of the Cl spectrum to zero
ClTT[1] = 0.
# make a 2D real space coordinate system
onesvec = np.ones(N)
inds = (np.arange(N)+.5 - N/2.) /(N-1.) # create an array of size N between -0.5 and +0.5
# compute the outer product matrix: X[i, j] = onesvec[i] * inds[j] for i,j
# in range(N), which is just N rows copies of inds - for the x dimension
X = np.outer(onesvec,inds)
# compute the transpose for the y dimension
Y = np.transpose(X)
# radial component R
R = np.sqrt(X**2. + Y**2.)
# now make a 2D CMB power spectrum
pix_to_rad = (pix_size/60. * np.pi/180.) # going from pix_size in arcmins to degrees and then degrees to radians
ell_scale_factor = 2. * np.pi /pix_to_rad # now relating the angular size in radians to multipoles
ell2d = R * ell_scale_factor # making a fourier space analogue to the real space R vector
ClTT_expanded = np.zeros(int(ell2d.max())+1)
# making an expanded Cl spectrum (of zeros) that goes all the way to the size of the 2D ell vector
ClTT_expanded[0:(ClTT.size)] = ClTT # fill in the Cls until the max of the ClTT vector
# the 2D Cl spectrum is defined on the multiple vector set by the pixel scale
CLTT2d = ClTT_expanded[ell2d.astype(int)]
#plt.imshow(np.log(CLTT2d))
# now make a realization of the CMB with the given power spectrum in real space
random_array_for_T = np.random.normal(0,1,(N,N))
FT_random_array_for_T = np.fft.fft2(random_array_for_T) # take FFT since we are in Fourier space
FT_2d = np.sqrt(CLTT2d) * FT_random_array_for_T # we take the sqrt since the power spectrum is T^2
#plt.imshow(np.real(FT_2d))
## make a plot of the 2D cmb simulated map in Fourier space, note the x and y axis labels need to be fixed
#Plot_CMB_Map(np.real(np.conj(FT_2d)*FT_2d*ell2d * (ell2d+1)/2/np.pi),0,np.max(np.conj(FT_2d)*FT_2d*ell2d * (ell2d+1)/2/np.pi),ell2d.max(),ell2d.max()) ###
# move back from ell space to real space
CMB_T = np.fft.ifft2(np.fft.fftshift(FT_2d))
# move back to pixel space for the map
CMB_T = CMB_T/(pix_size /60.* np.pi/180.)
# we only want to plot the real component
CMB_T = np.real(CMB_T)
## return the map
return(CMB_T)
###############################
def Plot_CMB_Map(Map_to_Plot,c_min,c_max,X_width,Y_width):
from mpl_toolkits.axes_grid1 import make_axes_locatable
print("map mean:",np.mean(Map_to_Plot),"map rms:",np.std(Map_to_Plot))
plt.gcf().set_size_inches(10, 10)
im = plt.imshow(Map_to_Plot, interpolation='bilinear', origin='lower',cmap=cm.RdBu_r)
im.set_clim(c_min,c_max)
ax=plt.gca()
divider = make_axes_locatable(ax)
cax = divider.append_axes("right", size="5%", pad=0.05)
cbar = plt.colorbar(im, cax=cax)
#cbar = plt.colorbar()
im.set_extent([0,X_width,0,Y_width])
plt.ylabel('angle $[^\circ]$')
plt.xlabel('angle $[^\circ]$')
cbar.set_label('tempearture [uK]', rotation=270)
plt.show()
return(0)
###############################
def Poisson_source_component(N,pix_size,Number_of_Sources,Amplitude_of_Sources):
"makes a realization of a naive Poisson-distributed point source map"
PSMap = np.zeros([np.int(N),np.int(N)])
i = 0
print('Number of sources required: ', Number_of_Sources)
while (i < int(Number_of_Sources)):
pix_x = np.int(N*np.random.rand())
pix_y = np.int(N*np.random.rand())
PSMap[pix_x,pix_y] += np.random.poisson(Amplitude_of_Sources)
i = i + 1
return(PSMap)
###############################
def Exponential_source_component(N,pix_size,Number_of_Sources_EX,Amplitude_of_Sources_EX):
N=int(N)
"makes a realization of a naive exponentially-distributed point source map"
PSMap = np.zeros([N,N])
i = 0
while (i < Number_of_Sources_EX):
pix_x = int(N*np.random.rand() )
pix_y = int(N*np.random.rand())
PSMap[pix_x,pix_y] += np.random.exponential(Amplitude_of_Sources_EX)
i = i + 1
return(PSMap)
###############################
def SZ_source_component(N,pix_size,Number_of_SZ_Clusters,Mean_Amplitude_of_SZ_Clusters,SZ_beta,SZ_Theta_core,do_plots):
"makes a realization of a nieve SZ map"
N=int(N)
SZMap = np.zeros([N,N])
SZcat = np.zeros([3,Number_of_SZ_Clusters]) ## catalogue of SZ sources, X, Y, amplitude
# make a distribution of point sources with varying amplitude
i = 0
while (i < Number_of_SZ_Clusters):
pix_x = np.int(N*np.random.rand())
pix_y = np.int(N*np.random.rand() )
pix_amplitude = np.random.exponential(Mean_Amplitude_of_SZ_Clusters)*(-1.)
SZcat[0,i] = pix_x
SZcat[1,i] = pix_y
SZcat[2,i] = pix_amplitude
SZMap[pix_x,pix_y] += pix_amplitude
i = i + 1
if (do_plots):
hist,bin_edges = np.histogram(SZMap,bins = 50,range=[SZMap.min(),-10])
plt.semilogy(bin_edges[0:-1],hist)
plt.xlabel('source amplitude [$\mu$K]')
plt.ylabel('number or pixels')
plt.show()
# make a beta function
beta = beta_function(N,pix_size,SZ_beta,SZ_Theta_core)
# convovle the beta funciton with the point source amplitude to get the SZ map
FT_beta = np.fft.fft2(np.fft.fftshift(beta))
FT_SZMap = np.fft.fft2(np.fft.fftshift(SZMap))
SZMap = np.fft.fftshift(np.real(np.fft.ifft2(FT_beta*FT_SZMap)))
# return the SZ map
return(SZMap,SZcat)
###############################
def beta_function(N,pix_size,SZ_beta,SZ_Theta_core):
# make a beta function
N=int(N)
ones = np.ones(N)
inds = (np.arange(N)+.5 - N/2.) * pix_size
X = np.outer(ones,inds)
Y = np.transpose(X)
R = np.sqrt(X**2. + Y**2.)
beta = (1 + (R/SZ_Theta_core)**2.)**((1-3.*SZ_beta)/2.)
# return the beta function map
return(beta)
###############################
def convolve_map_with_gaussian_beam(N,pix_size,beam_size_fwhp,Map):
"convolves a map with a gaussian beam pattern. NOTE: pix_size and beam_size_fwhp need to be in the same units"
# make a 2d gaussian
gaussian = make_2d_gaussian_beam(N,pix_size,beam_size_fwhp)
# do the convolution
FT_gaussian = np.fft.fft2(np.fft.fftshift(gaussian))
FT_Map = np.fft.fft2(np.fft.fftshift(Map))
convolved_map = np.fft.fftshift(np.real(np.fft.ifft2(FT_gaussian*FT_Map)))
# return the convolved map
return(convolved_map)
###############################
def make_2d_gaussian_beam(N,pix_size,beam_size_fwhp):
# make a 2d coordinate system
N=int(N)
ones = np.ones(N)
inds = (np.arange(N)+.5 - N/2.) * pix_size
X = np.outer(ones,inds)
Y = np.transpose(X)
R = np.sqrt(X**2. + Y**2.)
# make a 2d gaussian
beam_sigma = beam_size_fwhp / np.sqrt(8.*np.log(2))
gaussian = np.exp(-.5 *(R/beam_sigma)**2.)
gaussian = gaussian / np.sum(gaussian)
# return the gaussian
return(gaussian)
###############################
def make_noise_map(N,pix_size,white_noise_level,atmospheric_noise_level,one_over_f_noise_level):
"makes a realization of instrument noise, atmosphere and 1/f noise level set at 1 degrees"
## make a white noise map
N=int(N)
white_noise = np.random.normal(0,1,(N,N)) * white_noise_level/pix_size
## make an atmosperhic noise map
atmospheric_noise = 0.
if (atmospheric_noise_level != 0):
ones = np.ones(N)
inds = (np.arange(N)+.5 - N/2.)
X = np.outer(ones,inds)
Y = np.transpose(X)
R = np.sqrt(X**2. + Y**2.) * pix_size /60. ## angles relative to 1 degrees
mag_k = 2 * np.pi/(R+.01) ## 0.01 is a regularizaiton factor
atmospheric_noise = np.fft.fft2(np.random.normal(0,1,(N,N)))
atmospheric_noise = np.fft.ifft2(atmospheric_noise * np.fft.fftshift(mag_k**(5/3.)))* atmospheric_noise_level/pix_size
## make a 1/f map, along a single direction to illustrate striping
oneoverf_noise = 0.
if (one_over_f_noise_level != 0):
ones = np.ones(N)
inds = (np.arange(N)+.5 - N/2.)
X = np.outer(ones,inds) * pix_size /60. ## angles relative to 1 degrees
kx = 2 * np.pi/(X+.01) ## 0.01 is a regularizaiton factor
oneoverf_noise = np.fft.fft2(np.random.normal(0,1,(N,N)))
oneoverf_noise = np.fft.ifft2(oneoverf_noise * np.fft.fftshift(kx))* one_over_f_noise_level/pix_size
## return the noise map
noise_map = np.real(white_noise + atmospheric_noise + oneoverf_noise)
return(noise_map)
###############################
def Filter_Map(Map,N,N_mask):
N=int(N)
## set up a x, y, and r coordinates for mask generation
ones = np.ones(N)
inds = (np.arange(N)+.5 - N/2.)
X = np.outer(ones,inds)
Y = np.transpose(X)
R = np.sqrt(X**2. + Y**2.) ## angles relative to 1 degrees
## make a mask
mask = np.ones([N,N])
mask[np.where(np.abs(X) < N_mask)] = 0
return apply_filter(Map,mask)
def apply_filter(Map,filter2d):
## apply the filter in fourier space
FMap = np.fft.fftshift(np.fft.ifft2(np.fft.fftshift(Map)))
FMap_filtered = FMap * filter2d
Map_filtered = np.real(np.fft.fftshift(np.fft.fft2(FMap_filtered)))
## return the output
return(Map_filtered)
def cosine_window(N):
"makes a cosine window for apodizing to avoid edges effects in the 2d FFT"
# make a 2d coordinate system
ones = np.ones(N)
inds = (np.arange(N)+.5 - N/2.)/N *np.pi ## eg runs from -pi/2 to pi/2
X = np.outer(ones,inds)
Y = np.transpose(X)
# make a window map
window_map = np.cos(X) * np.cos(Y)
# return the window map
return(window_map)
###############################
def average_N_spectra(spectra,N_spectra,N_ells):
avgSpectra = np.zeros(N_ells)
rmsSpectra = np.zeros(N_ells)
# calcuate the average spectrum
i = 0
while (i < N_spectra):
avgSpectra = avgSpectra + spectra[i,:]
i = i + 1
avgSpectra = avgSpectra/(1. * N_spectra)
#calculate the rms of the spectrum
i =0
while (i < N_spectra):
rmsSpectra = rmsSpectra + (spectra[i,:] - avgSpectra)**2
i = i + 1
rmsSpectra = np.sqrt(rmsSpectra/(1. * N_spectra))
return(avgSpectra,rmsSpectra)
def calculate_2d_spectrum(Map,delta_ell,ell_max,pix_size,N,Map2=None):
"calculates the power spectrum of a 2d map by FFTing, squaring, and azimuthally averaging"
import matplotlib.pyplot as plt
# make a 2d ell coordinate system
N=int(N)
ones = np.ones(N)
inds = (np.arange(N)+.5 - N/2.) /(N-1.)
kX = np.outer(ones,inds) / (pix_size/60. * np.pi/180.)
kY = np.transpose(kX)
K = np.sqrt(kX**2. + kY**2.)
ell_scale_factor = 2. * np.pi
ell2d = K * ell_scale_factor
# make an array to hold the power spectrum results
N_bins = int(ell_max/delta_ell)
ell_array = np.arange(N_bins)
CL_array = np.zeros(N_bins)
# get the 2d fourier transform of the map
FMap = np.fft.ifft2(np.fft.fftshift(Map))
if Map2 is None: FMap2 = FMap.copy()
else: FMap2 = np.fft.ifft2(np.fft.fftshift(Map2))
# print FMap
PSMap = np.fft.fftshift(np.real(np.conj(FMap) * FMap2))
# print PSMap
# fill out the spectra
i = 0
while (i < N_bins):
ell_array[i] = (i + 0.5) * delta_ell
inds_in_bin = ((ell2d >= (i* delta_ell)) * (ell2d < ((i+1)* delta_ell))).nonzero()
CL_array[i] = np.mean(PSMap[inds_in_bin])
i = i + 1
CL_array_new = CL_array[~np.isnan(CL_array)]
ell_array_new = ell_array[~np.isnan(CL_array)]
# return the power spectrum and ell bins
return(ell_array_new,CL_array_new*np.sqrt(pix_size /60.* np.pi/180.)*2.)