Real-valued, time-periodic localized weak solutions for a semilinear wave equation with periodic potentials

TL;DR

This paper proves the existence of localized, time-periodic solutions for a class of semilinear wave equations with periodic potentials, using variational methods and spectral analysis, across different potential classes with explicit constructions.

Contribution

It introduces a unified approach to establish localized solutions for semilinear wave equations with various periodic potentials, including explicit potential constructions and spectral analysis techniques.

Findings

Existence of localized time-periodic solutions for p in (1, p*)

Explicit potential constructions in classes (P1) and (P2)

Spectral analysis ensures the wave operator's spectrum is bounded away from zero

Abstract

We consider the semilinear wave equation $V(x) u_{tt} -u_{xx}+q(x)u = \pm f(x,u)$ for three different classes (P1), (P2), (P3) of periodic potentials $V,q$. (P1) consists of periodically extended delta-distributions, (P2) of periodic step potentials and (P3) contains certain periodic potentials $V,q\in H^r_{\per}(\R)$ for $r\in [1,3/2)$. Among other assumptions we suppose that $|f(x,s)|\leq c(1+ |s|^p)$ for some $c>0$ and $p>1$. In each class we can find suitable potentials that give rise to a critical exponent $p^\ast$ such that for $p\in (1,p^\ast)$ both in the "+" and the "-" case we can use variational methods to prove existence of time-periodic real-valued solutions that are localized in the space direction. The potentials are constructed explicitely in class (P1) and (P2) and are found by a recent result from inverse spectral theory in class (P3). The critical exponent $p^\ast$ depends on the regularity of $V, q$. Our result builds upon a Fourier expansion of the solution and a detailed analysis of the spectrum of the wave operator. In fact, it turns out that by a careful choice of the potentials and the spatial and temporal periods, the spectrum of the wave operator $V(x)\partial_t^2-\partial_x^2+q(x)$ (considered on suitable space of time-periodic functions) is bounded away from $0$. This allows to find weak solutions as critical points of a functional on a suitable Hilbert space and to apply tools for strongly indefinite variational problems.