Spectral  summability for  the quartic  oscillator with applications to  the Engel group

Hajer Bahouri; Davide Barilari; Isabelle Gallagher; Matthieu Léautaud

doi:10.4171/jst/464

JournalsjstVol. 13, No. 2pp. 623–706

Spectral summability for the quartic oscillator with applications to the Engel group

Hajer Bahouri
CNRS & Sorbonne Université, Paris, France
Davide Barilari
Università di Padova, Italy
Isabelle Gallagher
École Normale Supérieure; Université Paris Cité, Paris, France
Matthieu Léautaud
Université Paris-Saclay, Orsay Cedex France

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Abstract

In this article, we investigate spectral properties of the sublaplacian $- Δ_{G}$ on the Engel group, which is the main example of a Carnot group of step 3. We develop a new approach to the Fourier analysis on the Engel group in terms of a frequency set.

This enables us to give fine estimates on the convolution kernel satisfying $F (- Δ_{G}) u = u ⋆ k_{F}$ , for suitable scalar functions $F$ , and in turn to obtain proofs of classical functional embeddings, via Fourier techniques.

This analysis requires a summability property on the spectrum of the quartic oscillator, which we obtain by means of semiclassical techniques and which is of independent interest.

Cite this article

Hajer Bahouri, Davide Barilari, Isabelle Gallagher, Matthieu Léautaud, Spectral summability for the quartic oscillator with applications to the Engel group. J. Spectr. Theory 13 (2023), no. 2, pp. 623–706

DOI 10.4171/JST/464