The singular set for a semilinear unstable problem

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Fotouhi, M ; Sharif University of Technology

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Type of Document: Article
DOI: 10.1007/s11118-017-9662-6
Abstract:
We study the regularity of solutions of the following semilinear problem(Formula presented.)where B1 is the unit ball in ℝn, 0 < q < 1 and λ± satisfy a Hölder continuity condition. Our main results concern local regularity analysis of solutions and their nodal set {u = 0}. The desired regularity is C[κ],κ−[κ] for κ = 2/(1 − q) and we divide the singular points in two classes. The first class contains the points where at least one of the derivatives of order less than κ is nonzero, the second class which is named (Formula presented.), is the set of points where all the derivatives of order less than κ exist and vanish. We prove that (Formula presented.) when κ is not an integer. Moreover, with an example we show that (Formula presented.) can be nonempty if κ ∈ ℕ. Finally, a regularity investigation in the plane shows that the singular points in (Formula presented.) are isolated. © 2017 Springer Science+Business Media B.V
Keywords:
Regularity ; Semilinear elliptic ; Unstable problem
Source: Potential Analysis ; 2017 , Pages 1-12 ; 09262601 (ISSN)
URL: https://link.springer.com/article/10.1007/s11118-017-9662-6