English

Schr\"odinger equations with singular potentials: linear and nonlinear boundary value problems

Analysis of PDEs 2018-03-13 v1

Abstract

Let ΩRN\Omega \subset {\mathbb R}^N (N3N \geq 3) be a C2C^2 bounded domain and FΩF \subset \partial \Omega be a C2C^2 submanifold of dimension 0kN20 \leq k \leq N-2. Put δF(x)=dist(x,F)\delta_F(x)=dist(x,F), V=δF2V=\delta_F^{-2} in Ω\Omega and LγV=Δ+γVL_{\gamma V}=\Delta + \gamma V. Denote by CH(V)C_H(V) the Hardy constant relative to VV in Ω\Omega. We study positive solutions of equations (LE) LγVu=0-L_{\gamma V} u = 0 and (NE) LγVu+f(u)=0-L_{\gamma V} u+ f(u) = 0 in Ω\Omega when γ<CH(V)\gamma < C_H(V) and fC(R)f \in C({\mathbb R}) is an odd, monotone increasing function. We establish the existence of a normalized boundary trace for positive solutions of (LE) - first studied by Marcus and Nguyen for the case F=ΩF=\partial \Omega - and employ it to investigate the behavior of subsolutions and super solutions of (LE) at the boundary. Using these results we study boundary value problems for (NE) and derive a-priori estimates. Finally we discuss subcriticality of (NE) at boundary points of Ω\Omega and establish existence and stability results when the data is concentrated on the set of subcritical points.

Keywords

Cite

@article{arxiv.1803.04214,
  title  = {Schr\"odinger equations with singular potentials: linear and nonlinear boundary value problems},
  author = {Moshe Marcus and Phuoc-Tai Nguyen},
  journal= {arXiv preprint arXiv:1803.04214},
  year   = {2018}
}

Comments

33 pages

R2 v1 2026-06-23T00:49:37.259Z