English

Nonlinear Schr\"odinger equation on real hyperbolic spaces

Analysis of PDEs 2010-01-07 v2 Classical Analysis and ODEs

Abstract

We consider the Schr\"odinger equation with no radial assumption on real hyperbolic spaces. We obtain sharp dispersive and Strichartz estimates for a large family of admissible pairs. As a first consequence, we get strong well-posedness results for NLS. Specifically, for small intial data, we prove L2L^2 and H1H^1 global well-posedness for any subcritical nonlinearity (in contrast with the Euclidean case) and with no gauge invariance assumption on the nonlinearity FF. On the other hand, if FF is gauge invariant, L2L^2 charge is conserved and hence, as in the Euclidean case, it is possible to extend local L2L^2 solutions to global ones. The corresponding argument in H1H^1 requires the conservation of energy, which holds under the stronger condition that FF is defocusing. Recall that global well-posedness in the gauge invariant case was already proved by Banica, Carles & Staffilani, for small radial L2L^2 data and for large radial H1H^1 data. The second important application of our global Strichartz estimates is "scattering" for NLS both in L2L^2 and in H1H^1, with no radial or gauge invariance assumption. Notice that, in the Euclidean case, this is only possible for the critical power γ=1+4n\gamma=1+\frac4n and can be false for subcritical powers while, on hyperbolic spaces, global existence and scattering of small L2L^2 solutions holds for all powers 1<γ1+4n1<\gamma\le1+\frac4n. If we restrict to defocusing nonlinearities FF, we can extend the H1H^1 scattering results of Banica, Carles & Staffilani to the nonradial case. Also there is no distinction anymore between short range and long range nonlinearity : the geometry of hyperbolic spaces makes every power-like nonlinearity short range.

Keywords

Cite

@article{arxiv.0801.3523,
  title  = {Nonlinear Schr\"odinger equation on real hyperbolic spaces},
  author = {Jean-Philippe Anker and Vittoria Pierfelice},
  journal= {arXiv preprint arXiv:0801.3523},
  year   = {2010}
}

Comments

Version 1 : 18 January 2008. Version 2 : 29 February 2008

R2 v1 2026-06-21T10:05:32.828Z