Abstract kinetic equations with positive collision operators

Abstract

We consider "forward-backward" parabolic equations in the abstract form Jd / d x + L = 0, 0< x < τ ≤ ∞, where J and L are operators in a Hilbert space H such that J=J*=J-1, L=L* ≥ 0, and L = 0. The following theorem is proved: if the operator B=JL is similar to a self-adjoint operator, then associated half-range boundary problems have unique solutions. We apply this theorem to corresponding nonhomogeneous equations, to the time-independent Fokker-Plank equation μ ∂ ∂ x (x,μ) = b(μ) ∂2 ∂ μ2 (x, μ), 0<x<τ, μ ∈ , as well as to other parabolic equations of the "forward-backward" type. The abstract kinetic equation T d /dx = - A (x) + f(x), where T=T* is injective and A satisfies a certain positivity assumption, is considered also.