SPARSE FARADAY ROTATION MEASURE SYNTHESIS

Faraday rotation measure synthesis is a method for analyzing multichannel polarized radio emissions, and it has emerged as an important tool in the study of Galactic and extragalactic magnetic fields. The method requires the recovery of the Faraday dispersion function from measurements restricted to limited wavelength ranges, which is an ill-conditioned deconvolution problem. Here, we discuss a recovery method that assumes a sparse approximation of the Faraday dispersion function in an overcomplete dictionary of functions. We discuss the general case when both thin and thick components are included in the model, and we present the implementation of a greedy deconvolution algorithm. We illustrate the method with several numerical simulations that emphasize the effect of the covered range and sampling resolution in the Faraday depth space, and the effect of noise on the observed data.

[1]  P. Vandergheynst,et al.  Compressed sensing imaging techniques for radio interferometry , 2008, 0812.4933.

[2]  Stéphane Mallat,et al.  Matching pursuits with time-frequency dictionaries , 1993, IEEE Trans. Signal Process..

[3]  松本 仁,et al.  Cosmic Magnetic Fields : from Planets, to Stars and Galaxies , 2009 .

[4]  L. Widrow,et al.  Origin of galactic and extragalactic magnetic fields , 2002, astro-ph/0207240.

[5]  Shea Brown,et al.  INTEGRATED POLARIZATION OF SOURCES AT λ ∼ 1 m AND NEW ROTATION MEASURE AMBIGUITIES , 2011, 1103.4149.

[6]  D. Sokoloff,et al.  Erratum: Depolarization and Faraday effects in galaxies , 1999 .

[7]  T. Landecker,et al.  The Dynamic Interstellar Medium: A Celebration of the Canadian Galactic Plane Survey , 2010 .

[8]  B. Burn On the Depolarization of Discrete Radio Sources by Faraday Dispersion , 1965 .

[9]  Netherlands,et al.  Multi-frequency polarimetry of the Galactic radio background around 350 MHz: II. A region in Horologium around l = 137, b = 7 , 2003, astro-ph/0304087.

[10]  D. Sokoloff,et al.  Depolarization and Faraday effects in galaxies , 1998 .

[11]  Stephen P. Boyd,et al.  Convex Optimization , 2004, Algorithms and Theory of Computation Handbook.

[12]  J. Whiteoak,et al.  The Polarization of Cosmic Radio Waves , 1966 .

[13]  D. Donoho,et al.  Atomic Decomposition by Basis Pursuit , 2001 .

[14]  F. Hoog,et al.  The application of compressive sampling to radio astronomy - II. Faraday rotation measure synthesis , 2011, 1106.1709.

[15]  K. Institute,et al.  Faraday rotation measure synthesis , 2005, astro-ph/0507349.

[16]  Emmanuel J. Candès,et al.  Near-Optimal Signal Recovery From Random Projections: Universal Encoding Strategies? , 2004, IEEE Transactions on Information Theory.

[17]  Extragalactic magnetic fields , 1994 .