English

Stability of solutions to some abstract evolution equations with delay

Functional Analysis 2020-12-15 v1

Abstract

The global existence and stability of the solution to the delay differential equation (*)u˙=A(t)u+G(t,u(tτ))+f(t)\dot{u} = A(t)u + G(t,u(t-\tau)) + f(t), t0t\ge 0, u(t)=v(t)u(t) = v(t), τt0-\tau \le t\le 0, are studied. Here A(t):HHA(t):\mathcal{H}\to \mathcal{H} is a closed, densely defined, linear operator in a Hilbert space H\mathcal{H} and G(t,u)G(t,u) is a nonlinear operator in H\mathcal{H} continuous with respect to uu and tt. We assume that the spectrum of A(t)A(t) lies in the half-plane λγ(t)\Re \lambda \le \gamma(t), where γ(t)\gamma(t) is not necessarily negative and G(t,u)α(t)up\|G(t,u)\| \le \alpha(t)\|u\|^p, p>1p>1, t0t\ge 0. Sufficient conditions for the solution to the equation to exist globally, to be bounded and to converge to zero as tt tends to \infty, under the non-classical assumption that γ(t)\gamma(t) can take positive values, are proposed and justified.

Keywords

Cite

@article{arxiv.2012.07552,
  title  = {Stability of solutions to some abstract evolution equations with delay},
  author = {N. S. Hoang and A. G. Ramm},
  journal= {arXiv preprint arXiv:2012.07552},
  year   = {2020}
}

Comments

13 pages, 0 figures

R2 v1 2026-06-23T20:57:11.434Z