English

Variational methods for some singular stochastic elliptic PDEs

Analysis of PDEs 2022-10-18 v2 Probability

Abstract

We use some tools from nonlinear analysis to study two examples of singular stochastic elliptic PDEs that cannot be solved by the contraction principle or the Schauder fixed point theorem. Let ξ\xi stand for a spatial white noise on a closed Riemannian surface SS. We prove the existence of a solution to the equation (Δ+a)u=f(u)+ξu (-\Delta + a)u = f(u) + \xi u with a potential aLp(S)a\in L^p(S) and p>1p>1, and ff subject to growth conditions. Under an additional parity condition on ff -- met for instance when f(u)=uuf(u) = u\vert u\vert^\ell, with \ell an even innteger, we further prove that this equation has infinitely many solutions, in stark contrast with all the well-posedness results that have been proved so far for singular stochastic PDEs under a small parameter assumption. This kind of results is obtained by seeing the equation as characterizing the critical points of an energy functional based on the Anderson operator H=Δ+ξH=\Delta + \xi and by resorting to variants of the mountain pass theorem. There are however some interesting equations that cannot be characterized as the critical points of an energy functional. Such is the case of the singular Choquard-Pecard equation on T2\mathbb{T}^2 (Δ+a)u=(wf(u))g(u)+ξu (-\Delta + a)u = \big(w\star f(u)\big)g(u) + \xi u One can use Ghoussoub's machinery of self-dual functionals to prove the existence of a solution to that equation as the minimum of a self-dual strongly coercive functional under proper assumptions on the coefficients a,w,fa,w,f and gg.

Keywords

Cite

@article{arxiv.2202.09628,
  title  = {Variational methods for some singular stochastic elliptic PDEs},
  author = {I. Bailleul and H. Eulry and T. Robert},
  journal= {arXiv preprint arXiv:2202.09628},
  year   = {2022}
}

Comments

v2, 15 pages, accepted and final version

R2 v1 2026-06-24T09:45:55.419Z