English

On spatial Gevrey regularity for some strongly dissipative second order evolution equations

Analysis of PDEs 2019-09-17 v1 Functional Analysis

Abstract

Let A be a positive self-adjoint linear operator acting on a real Hilbert space H and α\alpha, c be positive constants. We show that all solutions of the evolution equation u + Au + cA α\alpha u = 0 with u(0) \in D(A 1 2), u (0) \in H belong for all t > 0 to the Gevrey space G(A, σ\sigma) with σ\sigma = min{ 1 α\alpha , 1 1--α\alpha }. This result is optimal in the sense that σ\sigma can not be reduced in general. For the damped wave equation (SDW) α\alpha corresponding to the case where A = --Δ\Delta with domain D(A) = {w \in H 1 0 (Ω\Omega), Δ\Deltaw \in L 2 (Ω\Omega)} with Ω\Omega any open subset of R N and (u(0), u (0)) \in H 1 0 (Ω\Omega)xL 2 (Ω\Omega), the unique solution u of (SDW) α\alpha satisfies \forallt > 0, u(t) \in G s (Ω\Omega) with s = min{ 1 2α\alpha , 1 2(1--α\alpha) }, and this result is also optimal. Mathematics Subject Classification 2010 (MSC2010): 35L10, 35B65, 47A60.

Keywords

Cite

@article{arxiv.1909.07067,
  title  = {On spatial Gevrey regularity for some strongly dissipative second order evolution equations},
  author = {Alain Haraux and Mitsuharu Otani},
  journal= {arXiv preprint arXiv:1909.07067},
  year   = {2019}
}
R2 v1 2026-06-23T11:16:24.089Z