A positive ground state for a planar Choquard equation with mixed diffusion and critical exponential growth
Abstract
We study a two-dimensional Choquard equation driven by the mixed local and nonlocal operator L:=-Δ+(-Δ)s, where the nonlinearity has critical exponential growth of Trudinger--Moser type. Under a coercive assumption on the potential and suitable one-sided assumptions on the nonlinearity, we prove the existence of a least energy positive solution. The proof combines Nehari manifold minimization, compactness below the critical Trudinger--Moser threshold, local regularity, and a strong maximum principle.
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