Normalized multi-bump solutions for Choquard equation involving sublinear case

Abstract

In this paper, we study the existence of normalized multi-bump solutions for the following Choquard equation equation* -ε2 u +λ u=ε-(N-μ)(∫RNQ(y)|u(y)|p|x-y|μdy)Q(x)|u|p-2u, in\ RN, equation* where N≥3, μ∈ (0,N), ε>0 is a small parameter and λ∈R appears as a Lagrange multiplier. By developing a new variational approach, we show that the problem has a family of normalized multi-bump solutions focused on the isolated part of the local maximum of the potential Q(x) for sufficiently small ε>0. The asymptotic behavior of the solutions as ε→0 are also explored. It is worth noting that our results encompass the sublinear case p<2, which complements some of the previous works.