Nonexistence of positive solutions for Henon equation
Abstract
We consider the semilinear elliptic equation - u = |x|α up in RN, where N 3, α>-2 and p>1. We show that there are no positive solutions provided that the exponent p additionally verifies 1<p<N+2α+2N-2. This solves an open problem posed in previous literature, where only the radially symmetric case was fully understood. We also characterize all positive solutions when p=N+2α+2N-2 and -2<α<0.
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