Schr\"odinger Equation Driven by the Square of a Gaussian Field: Instanton Analysis in the Large Amplification Limit

Abstract

We study the tail of p(U), the probability distribution of U=(0,L)2, for U 1, (x,z) being the solution to ∂z -i2m∇2 =g S2\, , where S(x,z) is a complex Gaussian random field, z and x respectively are the axial and transverse coordinates, with 0 z L, and both m 0 and g>0 are real parameters. We perform the first instanton analysis of the corresponding Martin-Siggia-Rose action, from which it is found that the realizations of S concentrate onto long filamentary instantons, as U +∞. The tail of p(U) is deduced from the statistics of the instantons. The value of g above which U diverges coincides with the one obtained by the completely different approach developed in Mounaix et al. 2006 Commun. Math. Phys. 264~741. Numerical simulations clearly show a statistical bias of S towards the instanton for the largest sampled values of U. The high maxima -- or `hot spots' -- of S(x,z)2 for the biased realizations of S tend to cluster in the instanton region.