Diffusion Effects on the Breakdown of a Linear Amplifier Model Driven by the Square of a Gaussian Field
Abstract
We investigate solutions to the equation ∂t E - D E = λ S2 E, where S(x,t) is a Gaussian stochastic field with covariance C(x-x',t,t'), and x∈ Rd. It is shown that the coupling λcN(t) at which the N-th moment < EN(x,t)> diverges at time t, is always less or equal for D>0 than for D=0. Equality holds under some reasonable assumptions on C and, in this case, λcN(t)=Nλc(t) where λc(t) is the value of λ at which < λ∫0tS2(0,s)ds> diverges. The D=0 case is solved for a class of S. The dependence of λcN(t) on d is analyzed. Similar behavior is conjectured when diffusion is replaced by diffraction, D i D, the case of interest for backscattering instabilities in laser-plasma interaction.
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