Marta Calanchi, Simone Secchi, Elide Terraneo
Published 2007-05-10, updated 2008-06-10Version 2
For the equation (-\Delta u = | |x|-2 |^\alpha u^{p-1}), (1 < |x| < 3), we prove the existence of two solutions for (\alpha) large, and of two additional solutions when (p) is close to the critical Sobolev exponent (2^*=2N/(N-2)). A symmetry--breaking phenomenon appears, showing that the least--energy solutions cannot be radial functions.
Comments: Final version, accepted by Journal of Differential Equations
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