As a continuation of our previous work on the subject, we prove new measure invariance results for the Benjamin–Ono equation. The measures are associated with conservation laws whose leading term is a fractional Sobolev norm of order larger than or equal to 5/2. The new ingredient, compared with the case of conservation laws whose leading term is an integer Sobolev norm of order larger than or equal to 3 (that has been studied in our previous work), is the use of suitable orthogonality relations satisfied by multilinear products of centered complex independent Gaussian variables. We also give some partial results for the measures associated with the two remaining conservation laws at lower regularity. We plan to complete the proof of their invariance in a separated article which will be the final in the series. Finally in an appendix, we give a brief comparing of the recurrence properties of the flows of Benjamin–Ono and KdV equations.

Invariant measures and long time behavior of solutions to Benjamin-Ono equation II

VISCIGLIA, NICOLA
2014

Abstract

As a continuation of our previous work on the subject, we prove new measure invariance results for the Benjamin–Ono equation. The measures are associated with conservation laws whose leading term is a fractional Sobolev norm of order larger than or equal to 5/2. The new ingredient, compared with the case of conservation laws whose leading term is an integer Sobolev norm of order larger than or equal to 3 (that has been studied in our previous work), is the use of suitable orthogonality relations satisfied by multilinear products of centered complex independent Gaussian variables. We also give some partial results for the measures associated with the two remaining conservation laws at lower regularity. We plan to complete the proof of their invariance in a separated article which will be the final in the series. Finally in an appendix, we give a brief comparing of the recurrence properties of the flows of Benjamin–Ono and KdV equations.
N., Tzvetkov; Visciglia, Nicola
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Utilizza questo identificativo per citare o creare un link a questo documento: http://hdl.handle.net/11568/459868
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