July/August 2016 Precise exponential decay for solutions of semilinear elliptic equations and its effect on the structure of the solution set for a real analytic nonlinearity
Nils Ackermann, Norman Dancer
Differential Integral Equations 29(7/8): 757-774 (July/August 2016). DOI: 10.57262/die/1462298684

Abstract

We are concerned with the properties of weak solutions of the stationary Schrödinger equation $-\Delta u + Vu = f(u)$, $u\in H^1(\mathbb{R}^N)\cap L^\infty(\mathbb{R}^N)$, where $V$ is Hölder continuous and $\inf V>0$. Assuming $f$ to be continuous and bounded near $0$ by a power function with exponent larger than $1,$ we provide precise decay estimates at infinity for solutions in terms of Green's function of the Schrödinger operator. In some cases this improves known theorems on the decay of solutions. If $f$ is also real analytic on $(0,\infty)$, we obtain that the set of positive solutions is locally path connected. For a periodic potential $V$ this implies that the standard variational functional has discrete critical values in the low energy range and that a compact isolated set of positive solutions exists, under additional assumptions.

Citation

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Nils Ackermann. Norman Dancer. "Precise exponential decay for solutions of semilinear elliptic equations and its effect on the structure of the solution set for a real analytic nonlinearity." Differential Integral Equations 29 (7/8) 757 - 774, July/August 2016. https://doi.org/10.57262/die/1462298684

Information

Published: July/August 2016
First available in Project Euclid: 3 May 2016

zbMATH: 06604494
MathSciNet: MR3498876
Digital Object Identifier: 10.57262/die/1462298684

Subjects:
Primary: 35B40 , 35J91 , 5J20

Rights: Copyright © 2016 Khayyam Publishing, Inc.

Vol.29 • No. 7/8 • July/August 2016
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