Nonlinear Restoration of Diffused Images via Seeded Instability

We demonstrate a nonlinear method for restoring the quality of diffused images. It works by introducing a self-focusing medium into the optical path and allowing the underlying correlations to grow as they propagate. More specifically, the method is a dynamical stochastic resonance in which a weak signal seeds an instability in the diffuse background. The resonance is determined by the transition point between competing instabilities, with optimal growth occurring when the spatial scale of the instability matches that of the object of interest. The results are presented within the general framework of nonlinear statistical optics and have implications for information theory, basic wave physics, and nonlinear system design.

[1]  Can Sun,et al.  Nonlinear focusing and defocusing of partially coherent spatial beams. , 2009, Optics letters.

[2]  M. Soskin,et al.  Holographic storage in electrooptic crystals. i. steady state , 1978 .

[3]  M Segev,et al.  Modulation instability and pattern formation in spatially incoherent light beams. , 2000, Science.

[4]  Marin Soljacic,et al.  (1+1)-Dimensional modulation instability of spatially incoherent light , 2002 .

[5]  N. A. Krall,et al.  Principles of Plasma Physics , 1973 .

[6]  D. Dylov,et al.  Multiple-stream instabilities and soliton turbulence in photonic plasma , 2008 .

[7]  M. Segev,et al.  Theory of Self-Trapped Spatially Incoherent Light Beams , 1997 .

[8]  François Chapeau-Blondeau,et al.  Stochastic resonance and noise-enhanced transmission of spatial signals in optics: the case of scattering , 1998 .

[9]  R. Alfano,et al.  Ballistic 2-D Imaging Through Scattering Walls Using an Ultrafast Optical Kerr Gate , 1991, Science.

[10]  Photonic Plasma Instabilities and Soliton Turbulence in Spatially Incoherent Light , 2011 .

[11]  C. Barsi,et al.  Imaging through nonlinear media using digital holography , 2009 .

[12]  M. Segev,et al.  Transmission of images through highly nonlinear media by gradient-index lenses formed by incoherent solitons. , 2001, Optics letters.

[13]  M. Lisak,et al.  Relation between different formalisms describing partially incoherent wave propagation in nonlinear optical media , 2003 .

[14]  M. Teague Deterministic phase retrieval: a Green’s function solution , 1983 .

[15]  Dana Z. Anderson,et al.  RADIATION TRANSFER MODEL OF SELF-TRAPPING SPATIALLY INCOHERENT RADIATION BY NONLINEAR MEDIA , 1998 .

[16]  Z. Chen,et al.  Experiments on induced modulational instability of an incoherent optical beam. , 2001, Optics Letters.

[17]  J. M. Sancho,et al.  Noise in spatially extended systems , 1999 .

[18]  D Anderson,et al.  Features of modulational instability of partially coherent light: importance of the incoherence spectrum. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.

[19]  J R Fienup,et al.  Phase retrieval algorithms: a comparison. , 1982, Applied optics.

[20]  R. Fedele,et al.  A quantum-like Landau damping of an electromagnetic wavepacket , 2000 .

[21]  M. Segev,et al.  Theory Of Incoherent Self-focusing In Biased Photorefractive Media , 1997, QELS '97., Summaries of Papers Presented at the Quantum Electronics and Laser Science Conference.

[22]  Adi R. Bulsara,et al.  Tuning in to Noise , 1996 .

[23]  Gregoire Nicolis,et al.  Stochastic resonance , 2007, Scholarpedia.

[24]  A. Fraser Reconstructing attractors from scalar time series: A comparison of singular system and redundancy criteria , 1989 .

[25]  Zhigang Chen,et al.  Spatial soliton pixels from partially incoherent light. , 2002, Optics letters.

[26]  Partha P. Mitra,et al.  Nonlinear limits to the information capacity of optical fibre communications , 2000, Nature.

[27]  V. Semenov,et al.  Statistical theory for incoherent light propagation in nonlinear media. , 2001, Physical review. E, Statistical, nonlinear, and soft matter physics.

[28]  Thomas M. Cover,et al.  Elements of Information Theory , 2005 .

[29]  Sergey M. Bezrukov,et al.  Stochastic resonance in non-dynamical systems without response thresholds , 1997, Nature.

[30]  N. Streibl Three-dimensional imaging by a microscope , 1985 .

[31]  E. Spinozzi,et al.  Scale-free optics and diffractionless waves in nano-disordered ferroelectrics , 2011, 2011 Conference on Lasers and Electro-Optics Europe and 12th European Quantum Electronics Conference (CLEO EUROPE/EQEC).

[32]  Chen,et al.  Self-Trapping of Partially Spatially Incoherent Light. , 1996, Physical review letters.

[33]  M. Cross,et al.  Pattern formation outside of equilibrium , 1993 .

[34]  E. Spiller,et al.  Coherence and Fluctuations in Light Beams , 1964 .

[35]  M. Segev,et al.  Incoherent solitons in instantaneous nonlocal nonlinear media. , 2006, Physical review. E, Statistical, nonlinear, and soft matter physics.

[36]  R. Stephenson A and V , 1962, The British journal of ophthalmology.

[37]  T. Hansson,et al.  Quasi-Linear Evolution and Saturation of the Modulational Instability of Partially Coherent Optical Waves , 2008 .

[38]  J. Goodman Introduction to Fourier optics , 1969 .

[39]  A. Blanc-Lapierre,et al.  La notion de coherence en optique , 1955 .

[40]  Massimo Riani,et al.  Visual Perception of Stochastic Resonance , 1997 .

[41]  D. Staebler,et al.  Holographic storage in electrooptic crystals , 1973 .

[42]  Minoru Obara,et al.  PHOTOREFRACTIVE COHERENCE-GATED INTERFEROMETRY , 1998 .

[43]  W. Marsden I and J , 2012 .

[44]  Marin Soljacic,et al.  Modulation instability of incoherent beams in noninstantaneous nonlinear media , 2000 .

[45]  B Javidi,et al.  Generalization of the linear matched filter concept to nonlinear matched filters. , 1990, Applied optics.

[46]  Reverse propagation of femtosecond pulses in optical fibers. , 2003, Optics letters.

[47]  G. Millot,et al.  Incoherent modulation instability in instantaneous nonlinear Kerr media. , 2005, Optics letters.

[48]  E. Wolf,et al.  A Macroscopic Theory of Interference and Diffraction of Light from Finite Sources , 1953, Nature.

[49]  E. Wolf A macroscopic theory of interference and diffraction of light from finite sources, I. Fields with a narrow spectral range , 1954, Proceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences.

[50]  M Segev,et al.  Equivalence of three approaches describing partially incoherent wave propagation in inertial nonlinear media. , 2001, Physical review. E, Statistical, nonlinear, and soft matter physics.

[51]  Jason W. Fleischer,et al.  Nonlinear self-filtering of noisy images via dynamical stochastic resonance , 2010 .