L2 solutions for cubic NLS equation with fractional elliptic/hyperbolic operators on R×T and R2

Abstract

In this work we consider the Cauchy problem for the cubic Schr\"odinger equation posed on cylinder R×T with fractional derivatives (-∂y2)α,\, α >0, in the periodic direction. The spatial operator includes elliptic and hyperbolic regimes. We prove L2 global well-posedness results when α > 1 by proving a L4 - L2 Strichartz inequality for the linear equation, following the ideas developep by H. Takaoka and N. Tzvetkov in the the case of the Laplacian operator. Further, these results remain valid on the euclidean environment R2, so well-posedness in L2 are also achieved in this case. Our proof in the elliptic (hyperbolic) case does not work in the case 0<α <1 (0<α ≤ 1), respectively.

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