Artículo de revista
"Bubble-Tower" phenomena in a semilinear elliptic equation with mixed Sobolev growth
Fecha
2008-03-01Registro en:
NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS Volume: 68 Issue: 5 Pages: 1382-1397 Published: MAR 1 2008
0362-546X
10.1016/j.na.2006.12.032
Autor
Campos, Juan F.
Institución
Resumen
In this work we consider the following problem
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with N/(N - 2) < p < p* = (N + 2)/(N - 2) < q, N >= 3.
We prove that if p is fixed, and q is close enough to the critical exponent p*, then there exists a radial solution which behaves like a superposition of bubbles of different blow-up orders centered at the origin. Similarly when q is fixed and p is sufficiently close to the critical, we prove the existence of a radial solution which resembles a superposition of flat bubbles centered at the origin.