Non-uniqueness for the nonlocal Liouville equation in R and applications
Abstract
We construct multiple solutions to the nonlocal Liouville equation equation eqk L (-)12 u = K(x) eu in R. equation More precisely, for K of the form K(x) = 1+ (x) with ∈ (0,1) small and ∈ C1,α(R) L∞(R) for some α > 0, we prove existence of multiple solutions to eqk bifurcating from the bubbles. These solutions provide examples of flat metrics in the half-plane with prescribed geodesic curvature K(x) on its boundary. Furthermore, they imply the existence of multiple ground state soliton solutions for the Calogero-Moser derivative NLS.
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