Least action nodal solutions for the quadratic Choquard equation
Abstract
We prove the existence of a minimal action nodal solution for the quadratic Choquard equation - u + u = (Iα |u|2)u \; RN, where Iα is the Riesz potential of order α∈(0,N). The solution is constructed as the limit of minimal action nodal solutions for the nonlinear Choquard equations - u + u = (Iα |u|p)|u|p-2u \; RN when p 2. The existence of minimal action nodal solutions for p>2 can be proved using a variational minimax procedure over Nehari nodal set. No minimal action nodal solutions exist when p<2.
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