English

Periodic solutions for nonlinear evolution equations at resonance

Analysis of PDEs 2015-05-04 v1

Abstract

We are concerned with periodic problems for nonlinear evolution equations at resonance of the form u˙(t)=Au(t)+F(t,u(t))\dot u(t) = - A u(t) + F (t,u(t)), where a densely defined linear operator A ⁣:D(A)XA\colon D(A)\to X on a Banach space XX is such that A-A generates a compact C0C_0 semigroup and F ⁣:[0,+)×XXF\colon [0,+\infty)\times X \to X is a nonlinear perturbation. Imposing appropriate Landesman--Lazer type conditions on the nonlinear term FF, we prove a formula expressing the fixed point index of the associated translation along trajectories operator, in the terms of a time averaging of FF restricted to KerA\mathrm{Ker} \, A. By the formula, we show that the translation operator has a nonzero fixed point index and, in consequence, we conclude that the equation admits a periodic solution.

Keywords

Cite

@article{arxiv.1505.00156,
  title  = {Periodic solutions for nonlinear evolution equations at resonance},
  author = {Piotr Kokocki},
  journal= {arXiv preprint arXiv:1505.00156},
  year   = {2015}
}

Comments

26 pages

R2 v1 2026-06-22T09:26:34.478Z