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Main Author: Singh, Mandeep
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2501.10061
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author Singh, Mandeep
author_facet Singh, Mandeep
contents We investigate the sharp functional inequalities for the coherent state transforms of $SU(N,1)$. These inequalities are rooted in Wehrl's definition of semiclassical entropy and his conjecture about its minimum value. Lieb resolved this conjecture in 1978, posing a similar question for Bloch coherent states of $SU(2)$. The $SU(2)$ conjecture was settled by Lieb and Solovej in 2014, and the conjecture was extended for a wide class of Lie groups. The generalized Lieb conjecture has been resolved for several Lie groups, including $SU(N),\, N\geq 2$, $SU(1,1)$, and its $AX+B$ subgroup. Under the Li--Su assumption on isoperimetric regions in the complex hyperbolic ball, our sharp functional inequalities for the coherent state transforms extend this resolution to $SU(N,1),\, N\geq 2$. Additionally, we explore the Faber--Krahn inequality, which applies to the short-time Fourier transform with a Gaussian window. This inequality was previously proven by Nicola and Tilli and later extended by Ramos and Tilli to the wavelet transform. In this paper, we further extend this result within the framework of the Bergman space $\mathcal{A}_α$.
format Preprint
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institution arXiv
publishDate 2025
record_format arxiv
spellingShingle On the Lieb--Wehrl Entropy conjecture for $SU(N,1)$
Singh, Mandeep
Mathematical Physics
39B62, 22E45, 30H20, 81R30
We investigate the sharp functional inequalities for the coherent state transforms of $SU(N,1)$. These inequalities are rooted in Wehrl's definition of semiclassical entropy and his conjecture about its minimum value. Lieb resolved this conjecture in 1978, posing a similar question for Bloch coherent states of $SU(2)$. The $SU(2)$ conjecture was settled by Lieb and Solovej in 2014, and the conjecture was extended for a wide class of Lie groups. The generalized Lieb conjecture has been resolved for several Lie groups, including $SU(N),\, N\geq 2$, $SU(1,1)$, and its $AX+B$ subgroup. Under the Li--Su assumption on isoperimetric regions in the complex hyperbolic ball, our sharp functional inequalities for the coherent state transforms extend this resolution to $SU(N,1),\, N\geq 2$. Additionally, we explore the Faber--Krahn inequality, which applies to the short-time Fourier transform with a Gaussian window. This inequality was previously proven by Nicola and Tilli and later extended by Ramos and Tilli to the wavelet transform. In this paper, we further extend this result within the framework of the Bergman space $\mathcal{A}_α$.
title On the Lieb--Wehrl Entropy conjecture for $SU(N,1)$
topic Mathematical Physics
39B62, 22E45, 30H20, 81R30
url https://arxiv.org/abs/2501.10061