Normalized solutions for a class of fractional Choquard equations with the HLS lower critical term and a nonlocal perturbation

Abstract

In this paper, we study the mass-constrained fractional Choquard equation \( (-)s u = λ u + α (Iμ * |u|2N-μN)|u|2N-μN-2u + (Iμ * |u|p)|u|p-2u \) in \( RN \), under the constraint \( ∫RN |u|2 \, dx = c2 > 0 \), where \( N > 2s \), \( s ∈ (0,1) \), \( μ ∈ (0,N) \), \( α > 0 \), and \( 2 + 2s-μN p < 2N-μN-2s \). We first establish a nonexistence result in the \( L2 \)-critical case \( p = 2 + 2s-μN \). Then, in the \( L2 \)-supercritical range, we prove the existence of normalized ground states in two complementary regimes determined by the quantity \( M1(c) \). Our approach is based on constrained variational methods, a min-max construction, and refined estimates for the associated fiber maps.