Invariant measures and global well-posedness for a fractional Schr\"odinger equation with Moser-Trudinger type nonlinearity

Abstract

In this paper, we construct invariant measures and global-in-time solutions for a fractional Schr\" odinger equation with a Moser-Trudinger type nonlinearity i∂t u= (-)αu+ 2β u eβ |u|2,for(x,t)∈ \ M× R on a compact Riemannian manifold M without boundary of dimension d≥ 2. To do so, we use the so-called Inviscid-Infinite-dimensional limits introduced by Sy ('19) and Sy and Yu ('21). More precisely, we show that if s>d/2 or if s≤ d/2 and s≤ 1+α, there exists an invariant measure μs and a set s ⊂ Hs containing arbitrarily large data such that μs(s ) =1 and that the fractional NLS is globally well-posed on s. For strong regularities s>d/2 we also obtain a logarithmic upper bound on the growth of the Hr-norm of our solutions for r<s. This gives new examples of invariant measures supported in highly regular spaces in comparison with the Gibbs measure constructed by Robert ('21) for the same equation.

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