Normalized solutions for a fractional Choquard-type equation with exponential critical growth in R

Abstract

In this paper, we study the following fractional Choquard-type equation with prescribed mass align* cases (-)1/2u=λ u +(Iμ*F(u))f(u),\ \ in\ R, ∫R|u|2 dx=a2, cases align* where (-)1/2 denotes the 1/2-Laplacian operator, a>0, λ∈ R, Iμ(x)=1|x|μ with μ∈(0,1), F(u) is the primitive function of f(u), and f is a continuous function with exponential critical growth in the sense of the Trudinger-Moser inequality. By using a minimax principle based on the homotopy stable family, we obtain that there is at least one normalized ground state solution to the above equation.