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Autor principal: Speciel, Romain
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2504.12509
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author Speciel, Romain
author_facet Speciel, Romain
contents Understanding how spectral quantities localize on manifolds is a central theme in geometric spectral theory and index theory. Within this framework, the BFK formula, obtained by Burghelea, Friedlander and Kappeler in 1992, describes how the zeta-regularized determinant of an elliptic operator decomposes as the underlying manifold is cut into pieces. In this paper, we present a novel proof of this result. Inspired by work of Brüning and Lesch on the eta invariant of Dirac operators, we derive the BFK formula by interpolating continuously between boundary conditions and understanding the variation of the determinant along this deformation.
format Preprint
id arxiv_https___arxiv_org_abs_2504_12509
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A Deformation Approach to the BFK Formula
Speciel, Romain
Analysis of PDEs
58J52 (Primary) 58J37 (Secondary)
Understanding how spectral quantities localize on manifolds is a central theme in geometric spectral theory and index theory. Within this framework, the BFK formula, obtained by Burghelea, Friedlander and Kappeler in 1992, describes how the zeta-regularized determinant of an elliptic operator decomposes as the underlying manifold is cut into pieces. In this paper, we present a novel proof of this result. Inspired by work of Brüning and Lesch on the eta invariant of Dirac operators, we derive the BFK formula by interpolating continuously between boundary conditions and understanding the variation of the determinant along this deformation.
title A Deformation Approach to the BFK Formula
topic Analysis of PDEs
58J52 (Primary) 58J37 (Secondary)
url https://arxiv.org/abs/2504.12509