Fredholm Solvability of Periodic Neumann Problem for a Linear Telegraph Equation

Abstract

We investigate the linear telegraph equation utt-uxx+2μ ut=f(x,t) with periodic Neumann boundary conditions. We prove that the operator of the problem is modeled as a Fredholm operator of index zero in the scale of Sobolev-type spaces of periodic functions. This result extends to small perturbations of the equation where μ becomes variable and discontinuous or an additional zero-order term appears. We also show that the solutions to the problem are smoothing.