Time-Periodic Second-Order Hyperbolic Equations: Fredholmness, Regularity, and Smooth Dependence

Abstract

The paper concerns the general linear one-dimensional second-order hyperbolic equation ∂2tu - a2(x,t)∂2xu + a1(x,t)∂tu + a2(x,t)∂xu + a3(x,t)u=f(x,t), x∈(0,1) with periodic conditions in time and Robin boundary conditions in space. Under a non-resonance condition (formulated in terms of the coefficients a, a1, and a2) ruling out the small divisors effect, we prove the Fredholm alternative. Moreover, we show that the solutions have higher regularity if the data have higher regularity and if additional non-resonance conditions are fulfilled. Finally, we state a result about smooth dependence on the data, where perturbations of the coefficient a lead to the known loss of smoothness while perturbations of the coefficients a1, a2, and a3 do not.