Periodic Solutions to Dissipative Hyperbolic Systems. I: Fredholm Solvability of Linear Problems

Abstract

This paper concerns linear first-order hyperbolic systems in one space dimension of the type ∂tuj + aj(x,t)∂xuj + Σk=1nbjk(x,t)uk = fj(x,t),\; x ∈ (0,1),\; j=1,…,n, with periodicity conditions in time and reflection boundary conditions in space. We state a non-resonance condition (depending on the coefficients aj and bjj and the boundary reflection coefficients), which implies Fredholm solvability of the problem in the space of continuous functions. Further, we state one more non-resonance condition (depending also on ∂taj), which implies C1-solution regularity. Moreover, we give examples showing that both non-resonance conditions cannot be dropped, in general. Those conditions are robust under small perturbations of the problem data. Our results work for many non-strictly hyperbolic systems, but they are new even in the case of strict hyperbolicity.