Hardy inequalities for large fermionic systems

Rupert L. Frank; Thomas Hoffmann-Ostenhof; Ari Laptev; Jan Philip Solovej

doi:10.4171/JST/511

Hardy inequalities for large fermionic systems

Rupert L. Frank, Thomas Hoffmann-Ostenhof, Ari Laptev, Jan Philip Solovej

Department of Mathematical Sciences

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Abstract

Given 0 < s < d/2 with s ≤ 1, we are interested in the large N-behavior of the optimal constant κN in the Hardy inequality ΣNn=1(-Δn)s ≥ κN Σn<m |Xn - Xm|-2s, when restricted to antisymmetric functions. We show that N1-2s/d κN has a positive, finite limit given by a certain variational problem, thereby generalizing a result of Lieb and Yau related to the Chandrasekhar theory of gravitational collapse.

Original language	English
Journal	Journal of Spectral Theory
Volume	14
Issue number	2
Pages (from-to)	805-835
ISSN	1664-039X
DOIs	https://doi.org/10.4171/JST/511
Publication status	Published - 2024

Bibliographical note

Publisher Copyright:
©2024 European Mathematical Society.

Keywords

electrostatic inequalities
fermions
Hardy inequalities
semi-classical limit

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Cite this

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KW - semi-classical limit

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