Spectrum of the fokker-planck operator representing diffusion in a random velocity field.
Phys Rev E Stat Phys Plasmas Fluids Relat Interdiscip Topics 61:1 (2000) 196-203
Abstract:
We study spectral properties of the Fokker-Planck operator that represents particles moving via a combination of diffusion and advection in a time-independent random velocity field, presenting in detail work outlined elsewhere [J. T. Chalker and Z. J. Wang, Phys. Rev. Lett. 79, 1797 (1997)]. We calculate analytically the ensemble-averaged one-particle Green function and the eigenvalue density for this Fokker-Planck operator, using a diagrammatic expansion developed for resolvents of non-Hermitian random operators, together with a mean-field approximation (the self-consistent Born approximation) which is well controlled in the weak-disorder regime for dimension d>2. The eigenvalue density in the complex plane is nonzero within a wedge that encloses the negative real axis. Particle motion is diffusive at long times, but for short times we find a novel time dependence of the mean-square displacement,p>2 spin glasses with first-order ferromagnetic transitions
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL 33:16 (2000) 3081-3091
A simple model of a glass with finite-range periodic interactions
JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL 33:50 (2000) L497-L502
Can polymer coils be modeled as "soft colloids"?
PHYSICAL REVIEW LETTERS 85:12 (2000) 2522-2525
Comment on "Thermal model for adaptive competition in a market - Cavagna et al. reply
PHYSICAL REVIEW LETTERS 85:23 (2000) 5009-5009