Normalized ground states for a biharmonic Choquard equation with exponential critical growth
Abstract
In this paper, we consider the normalized ground state solution for the following biharmonic Choquard type problem align* split \ arrayll 2u-β u=λ u+(Iμ*F(u))f(u), in\ \ R4, ∫R4|u|2dx=c2, u∈ H2(R4), array . split align* where β≥0, c>0, λ∈ R, Iμ=1|x|μ with μ∈ (0,4), F(u) is the primitive function of f(u), and f is a continuous function with exponential critical growth in the sense of the Adams inequality. By using a minimax principle based on the homotopy stable family, we obtain that the above problem admits at least one ground state normalized solution.
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