All the almost periodic solutions for nonintegrable PDEs found in the literature are very regular (at least C-infinity) and, hence, very close to quasiperiodic ones. This fact is deeply exploited in the existing proofs. Proving the existence of almost periodic solutions with finite regularity is a main open problem in KAM theory for PDEs. Here we consider the 1-dimensional NLS with external parameters and construct almost periodic solutions which have only Sobolev regularity both in time and space. Moreover, many of our solutions are so only in a weak sense. This is the first result on existence of weak (i.e., nonclassical) solutions for nonintegrable PDEs in KAM theory.
Biasco, L., Massetti, J.e., Procesi, M. (2023). Small amplitude weak almost periodic solutions for the 1d NLS. DUKE MATHEMATICAL JOURNAL, 172(14), 2643-2714 [10.1215/00127094-2022-0089].
Small amplitude weak almost periodic solutions for the 1d NLS
Massetti, Jessica Elisa
;
2023-01-01
Abstract
All the almost periodic solutions for nonintegrable PDEs found in the literature are very regular (at least C-infinity) and, hence, very close to quasiperiodic ones. This fact is deeply exploited in the existing proofs. Proving the existence of almost periodic solutions with finite regularity is a main open problem in KAM theory for PDEs. Here we consider the 1-dimensional NLS with external parameters and construct almost periodic solutions which have only Sobolev regularity both in time and space. Moreover, many of our solutions are so only in a weak sense. This is the first result on existence of weak (i.e., nonclassical) solutions for nonintegrable PDEs in KAM theory.File | Dimensione | Formato | |
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