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Main Author: Trapasso, S. Ivan
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2306.00592
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author Trapasso, S. Ivan
author_facet Trapasso, S. Ivan
contents We prove boundedness results on modulation and Wiener amalgam spaces for some families of spectral multipliers for the twisted Laplacian. We exploit the metaplectic equivalence relating the twisted Laplacian with a partial harmonic oscillator, leading to a general transference principle for the corresponding spectral multipliers. Our analysis encompasses powers of the twisted Laplacian and oscillating multipliers, with applications to the corresponding Schrödinger and wave flows. On the other hand, elaborating on the twisted convolution structure of the eigenprojections and its connection with the Weyl product of symbols, we obtain a complete picture of the boundedness of the heat flow for the twisted Laplacian. Results of the same kind are established for fractional heat flows via subordination.
format Preprint
id arxiv_https___arxiv_org_abs_2306_00592
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Phase space analysis of spectral multipliers for the twisted Laplacian
Trapasso, S. Ivan
Analysis of PDEs
Functional Analysis
35K05, 35L05, 42B35, 35S05, 35Q40, 35R11, 35A18
We prove boundedness results on modulation and Wiener amalgam spaces for some families of spectral multipliers for the twisted Laplacian. We exploit the metaplectic equivalence relating the twisted Laplacian with a partial harmonic oscillator, leading to a general transference principle for the corresponding spectral multipliers. Our analysis encompasses powers of the twisted Laplacian and oscillating multipliers, with applications to the corresponding Schrödinger and wave flows. On the other hand, elaborating on the twisted convolution structure of the eigenprojections and its connection with the Weyl product of symbols, we obtain a complete picture of the boundedness of the heat flow for the twisted Laplacian. Results of the same kind are established for fractional heat flows via subordination.
title Phase space analysis of spectral multipliers for the twisted Laplacian
topic Analysis of PDEs
Functional Analysis
35K05, 35L05, 42B35, 35S05, 35Q40, 35R11, 35A18
url https://arxiv.org/abs/2306.00592