Normalized solutions for a class of fractional Choquard equations with mixed nonlinearities

Abstract

In this paper we study the following fractional Choquard equation with mixed nonlinearities: \[ \ arrayl (-)s u = λ u + α ( Iμ * |u|q ) |u|q-2 u + ( Iμ * |u|p ) |u|p-2 u, x ∈ RN, \\[4pt] ∫RN |u|2 \,dx = c2 > 0. array . \] Here N > 2s, s ∈ (0,1), μ ∈ (0, N), and the exponents satisfy \[ 2N - μN < q < p < 2N - μN - 2s, \] while α > 0 is a sufficiently small parameter, λ ∈ R is the Lagrange multiplier associated with the mass constraint, and Iμ denotes the Riesz potential. We establish existence and multiplicity results for normalized solutions and, in addition, prove the existence of ground state normalized solutions for α in a suitable range.

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