Uniqueness for the Nonlocal Liouville Equation in R
Abstract
We prove uniqueness of solutions for the nonlocal Liouville equation (-)1/2 w = K ew in R with finite total Q-curvature ∫R K ew \, dx< +∞. Here the prescribed Q-curvature function K=K(|x|) > 0 is assumed to be a positive, symmetric-decreasing function satisfying suitable regularity and decay bounds. In particular, we obtain uniqueness of solutions in the Gaussian case with K(x) = (-x2). Our uniqueness proof exploits a connection of the nonlocal Liouville equation to ground state solitons for Calogero--Moser derivative NLS, which is a completely integrable PDE recently studied by P. G\'erard and the second author.
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