Coherent-mode representation of a statistically homogeneous and isotropic electromagnetic field in spherical volume.

It is known that statistically stationary, homogeneous, and isotropic source distributions generate, in an unbounded low-loss medium, an electromagnetic field whose electric cross-spectral density tensor is proportional to the imaginary part of the infinite-space Green tensor. Using the recently established electromagnetic theory of coherent modes, we construct, in a finite spherical volume, the coherent-mode representation of the random electromagnetic field having this property. The analysis covers the fundamental case of blackbody radiation but is valid more generally; since a thermal equilibrium condition is not invoked, the electromagnetic field may have any spectral distribution. Within the scalar theory of coherent modes, which has been available for more than two decades, the analogous formulation results in the first explicit three-dimensional coherent-mode representation.

[1]  Coherence theory of the electromagnetic field , 1963 .

[2]  Reply to comment on ¿Radiation from arbitrarily polarized spatially incoherent planar sources¿ , 2004 .

[3]  E. Wolf Comment on "Complete electromagnetic coherence in the space-frequency domain". , 2004, Optics letters.

[4]  E. Wolf Comment on a paper ‘Radiation from arbitrarily polarized spatially incoherent source’ , 2004 .

[5]  Complete electromagnetic coherence in the space-frequency domain. , 2004, Optics letters.

[6]  F. Gori,et al.  Field correlations within a homogeneous and isotropic source , 1994 .

[7]  J. Murphy,et al.  Dyadic analysis of partially coherent submillimeter-wave antenna systems , 2001 .

[8]  A. Friberg,et al.  Degree of coherence for electromagnetic fields. , 2003, Optics express.

[9]  E. Wolf Unified theory of coherence and polarization of random electromagnetic beams , 2003 .

[10]  Wolf,et al.  Far-zone behavior of electromagnetic fields generated by fluctuating current distributions. , 1987, Physical review. A, General physics.

[11]  W. H. Carter,et al.  Field correlations within a completely incoherent primary spherical source , 1986 .

[12]  Tero Setälä,et al.  Spatial correlations and degree of polarization in homogeneous electromagnetic fields. , 2003, Optics letters.

[13]  E. Wolf New theory of partial coherence in the space–frequency domain. Part I: spectra and cross spectra of steady-state sources , 1982 .

[14]  William H. Carter,et al.  Coherence properties of lambertian and non-lambertian sources* , 1975 .

[15]  B. Karczewski,et al.  Degree of coherence of the electromagnetic field , 1963 .

[16]  A. Friberg,et al.  Complete electromagnetic coherence in the space-frequency domain. , 2004, Optics letters.

[17]  Coherence Properties of Blackbody Radiation. III. Cross-Spectral Tensors , 1967 .

[18]  W. W. Hansen A New Type of Expansion in Radiation Problems , 1935 .

[19]  C. Brouder,et al.  Mie scattering of a partially coherent beam , 1998 .

[20]  A. Friberg,et al.  Universality of electromagnetic-field correlations within homogeneous and isotropic sources. , 2003, Physical review. E, Statistical, nonlinear, and soft matter physics.

[21]  Franco Gori,et al.  Coherent-mode decomposition of partially polarized, partially coherent sources. , 2003, Journal of the Optical Society of America. A, Optics, image science, and vision.

[22]  A. Friberg,et al.  Degree of polarization for optical near fields. , 2002, Physical review. E, Statistical, nonlinear, and soft matter physics.

[23]  A. Friberg,et al.  Theory of partially coherent electromagnetic fields in the space-frequency domain. , 2004, Journal of the Optical Society of America. A, Optics, image science, and vision.

[24]  D. Wall Circularly symmetric Green tensors for the harmonic vector wave equation in spheroidal coordinate systems , 1978 .

[25]  Girish S. Agarwal,et al.  Quantum electrodynamics in the presence of dielectrics and conductors. I. Electromagnetic-field response functions and black-body fluctuations in finite geometries , 1975 .

[26]  A. Friberg,et al.  Theorems on complete electromagnetic coherence in the space-time domain , 2004 .

[27]  R. E. Coilin DYADIC GREEN'S FUNCTION EXPANSIONS IN SPHERICAL COORDINATES , 1986 .