Let Omega be a bounded smooth domain in R-N, N >= 3, and let M be a compact smooth submanifold of Omega without boundary such that 1 <= dim M <= N - 2. We consider the problem -Delta u = vertical bar u vertical bar(2*-2)u in Omega(epsilon), u = 0 on partial derivative Omega(epsilon), where Omega(epsilon) : = {x is an element of Omega : dist(x, M) > epsilon}, 2* := 2N/N-2 is the critical Sobolev exponent, and epsilon > 0 is small enough. Under some additional assumptions we obtain the multiplicity of positive and sign changing solutions.
Multiple solutions to the Bahri-Coron problem in domains with a shrinking hole of positive dimension / Monica, Clapp; Grossi, Massimo; Pistoia, Angela. - In: COMPLEX VARIABLES AND ELLIPTIC EQUATIONS. - ISSN 1747-6933. - 57:11(2012), pp. 1147-1162. [10.1080/17476931003628265]
Multiple solutions to the Bahri-Coron problem in domains with a shrinking hole of positive dimension
GROSSI, Massimo;PISTOIA, Angela
2012
Abstract
Let Omega be a bounded smooth domain in R-N, N >= 3, and let M be a compact smooth submanifold of Omega without boundary such that 1 <= dim M <= N - 2. We consider the problem -Delta u = vertical bar u vertical bar(2*-2)u in Omega(epsilon), u = 0 on partial derivative Omega(epsilon), where Omega(epsilon) : = {x is an element of Omega : dist(x, M) > epsilon}, 2* := 2N/N-2 is the critical Sobolev exponent, and epsilon > 0 is small enough. Under some additional assumptions we obtain the multiplicity of positive and sign changing solutions.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
