Oscillating solutions for nonlinear equations involving the Pucci's extremal operators
Abstract
This paper deals with the following nonlinear equations \[ Mλ,(D2 u)+g(u)=0 in RN, \] where Mλ, are the Pucci's extremal operators, for N 1 and under the assumption g'(0)>0. We show the existence of oscillating solutions, namely with an unbounded sequence of zeros. Moreover these solutions are periodic, if N=1, while they are radial symmetric and decay to zero at infinity with their derivatives, if N 2.
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