On a nonlocal Zakharov equation

We study global existence and large time asymptotic behavior of solutions to the initial-boundary value problem for the nonlinear nonlocal equation on a segment where the pseudodifferential operator Ku on a segment [0, a] is defined by Ku= C is chosen such that ReK(p) > 0 for Rep = 0. We prove tha

This paper deals with the nonlocal anisotropic -→ p (x)-Laplacian Dirichlet problems with non-variational form and with variational form where F (x, t) = t 0 f (x, s)ds, and a i is allowed to be singular at zero. Using (S + ) mapping theory and the variational method, some results on existence and

A new conservative difference scheme is presented for the periodic initial-value problem of Zakharov equations. The scheme can be implicit or semi-explicit, depending on the choice of a parameter. The discretization of the initial condition is of second-order accuracy, which is consistent with the a