English

On some Variational Problems set on domains tending to infinity

Analysis of PDEs 2016-02-10 v1

Abstract

Let Ω=ω1×ω2\Omega_\ell = \ell\omega_1 \times \omega_2 where ω1Rp\omega_1 \subset \R^p and ω2Rnp\omega_2 \subset \R^{n-p} are assumed to be open and bounded. We consider the following minimization problem: EΩ(u)=minuW01,q(Ω)EΩ(u)E_{\Omega_\ell}(u_\ell) = \min_{u\in W_0^{1,q}(\Omega_\ell)}E_{\Omega_\ell}(u) where EΩ(u)=ΩF(\gradu)fuE_{\Omega_\ell}(u) = \int_{\Omega_\ell}F(\grad u)-fu, FF is a convex function and fLq(ω2)f\in L^{q'}(\omega_2). We are interested in studying the asymptotic behavior of the solution uu_\ell as \ell tends to infinity.

Keywords

Cite

@article{arxiv.1602.02808,
  title  = {On some Variational Problems set on domains tending to infinity},
  author = {Michel Chipot and Aleksandar Mojsic and Prosenjit Roy},
  journal= {arXiv preprint arXiv:1602.02808},
  year   = {2016}
}

Comments

to appear in DCDS-Series A

R2 v1 2026-06-22T12:46:05.790Z