English

Time-Periodic Solutions for Hyperbolic-Parabolic Systems

Analysis of PDEs 2026-01-30 v2

Abstract

Time-periodic weak solutions for a coupled hyperbolic-parabolic system are obtained. A linear heat and wave equation are considered on two respective dd-dimensional spatial domains that share a common (d1)(d-1)-dimensional interface Γ\Gamma. The system is only partially damped, leading to an indeterminate case for existing theory (Galdi et al., 2014). We construct periodic solutions by obtaining novel a priori estimates for the coupled system, reconstructing the total energy via the interface Γ\Gamma. As a byproduct, geometric constraints manifest on the wave domain which are reminiscent of classical boundary control conditions for wave stabilizability. We note a ``loss" of regularity between the forcing and solution which is greater than that associated with the heat-wave Cauchy problem. However, we consider a broader class of spatial domains and mitigate this regularity loss by trading time and space differentiations, a feature unique to the periodic setting. This seems to be the first constructive result addressing existence and uniqueness of periodic solutions in the heat-wave context, where no dissipation is present in the wave interior. Our results speak to the open problem of the (non-)emergence of resonance in complex systems, and are readily generalizable to related systems and certain nonlinear cases.

Keywords

Cite

@article{arxiv.2412.18801,
  title  = {Time-Periodic Solutions for Hyperbolic-Parabolic Systems},
  author = {Stanislav Mosny and Boris Muha and Sebastian Schwarzacher and Justin T. Webster},
  journal= {arXiv preprint arXiv:2412.18801},
  year   = {2026}
}

Comments

11 figures, 2 appendices

R2 v1 2026-06-28T20:48:36.416Z