On the existence of normalized solutions to a class of fractional Choquard equation with potentials

Abstract

This paper investigates the existence of normalized solutions to the nonlinear fractional Choquard equation: (-)s u+V(x) u=λ u+f(x)(Iα *(f|u|q))|u|q-2 u+g(x)(Iα *(g|u|p))|u|p-2 u, x ∈ RN subject to the mass constraint ∫RN|u|2 d x=a>0, where N>2 s, s ∈(0,1), α ∈(0, N), and N+αN ≤ q<p ≤ N+α+2 sN. Here, the parameter λ ∈ R appears as an unknown Lagrange multiplier associated with the normalization condition. By employing variational methods under appropriate assumptions on the potentials V(x), f(x), and g(x), we establish several existence results for normalized solutions.