Normalized solutions for a Choquard equation with exponential growth in R2
Abstract
In this paper, we study the existence of normalized solutions to the following nonlinear Choquard equation with exponential growth align* \ aligned &- u+λ u=(Iα F(u))f(u), in R2,\\ &∫R2|u|2dx=a2, aligned . align* where a>0 is prescribed, λ∈ R, α∈(0,2), Iα denotes the Riesz potential, indicates the convolution operator, the function f(t) has exponential growth in R2 and F(t)=∫t0f(τ)dτ. Using the Pohozaev manifold and variational methods, we establish the existence of normalized solutions to the above problem.
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