Existence and singularities for the Dirichlet boundary value problems of Landau–Lifshitz equations

We study the following generalized 1D Ginzburg-Landau equation on ~ = (0, c~) x (0, oo) Under suitable conditions, we prove that there is a unique H 1 weak solution that exists for all time. ~

A and T be positive numbers. The singular differential equation (T(I)=')' = pq(t)f(t,r) is considered. Here T > 0 on (0, A] may be singular at I = 0, and f(t,~) < 0 may be singular at I = 0 and I = A. Effective sufficient conditions imposed on T, p, q, and f are given for the existence of a solution

This paper establishes existence and uniqueness of the weak solution to the Ginzburg-Landau equation posed in a finite domain Q = [0, L] for t 2 0, with certain initial-boundary data.

This paper presents two sufficmnt condIUons whmh guarantee the existence and umqueness of a positive solution for a class of singular boundary value problems