四次振子的谱可和性及其在恩格尔群中的应用

IF 1 3区 数学 Q1 MATHEMATICS Journal of Spectral Theory Pub Date : 2023-10-07 DOI:10.4171/jst/464
Hajer Bahouri, Davide Barilari, Isabelle Gallagher, Matthieu Léautaud
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引用次数: 2

摘要

在本文中,我们研究了$-\Delta\_{G}$在Engel群上的谱性质,Engel群是第3步卡诺群的主要例子。本文提出了一种基于频率集的恩格尔群傅里叶分析的新方法。这使我们能够对满足$F(-\Delta\_{G})u=u\ * k\_{F}$的卷积核给出精细估计,对于合适的标量函数$F$,进而通过傅里叶技术获得经典函数嵌入的证明。这种分析需要四次振子的谱具有可和性,这是我们用半经典技术得到的,这是一个独立的研究课题。
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Spectral summability for the quartic oscillator with applications to the Engel group
In this article, we investigate spectral properties of the sublaplacian $-\Delta\_{G}$ 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 $F(-\Delta\_{G})u=u\star k\_{F}$, 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.
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来源期刊
Journal of Spectral Theory
Journal of Spectral Theory MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
2.00
自引率
0.00%
发文量
30
期刊介绍: The Journal of Spectral Theory is devoted to the publication of research articles that focus on spectral theory and its many areas of application. Articles of all lengths including surveys of parts of the subject are very welcome. The following list includes several aspects of spectral theory and also fields which feature substantial applications of (or to) spectral theory. Schrödinger operators, scattering theory and resonances; eigenvalues: perturbation theory, asymptotics and inequalities; quantum graphs, graph Laplacians; pseudo-differential operators and semi-classical analysis; random matrix theory; the Anderson model and other random media; non-self-adjoint matrices and operators, including Toeplitz operators; spectral geometry, including manifolds and automorphic forms; linear and nonlinear differential operators, especially those arising in geometry and physics; orthogonal polynomials; inverse problems.
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