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Main Authors: Střeleček, Jan, Novotný, Jakub, Cejnar, Pavel
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2605.28351
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author Střeleček, Jan
Novotný, Jakub
Cejnar, Pavel
author_facet Střeleček, Jan
Novotný, Jakub
Cejnar, Pavel
contents Parametric Hamiltonians often exhibit point-like spectral degeneracies (diabolic points, or conical intersections), which can lead to singularities in the Provost-Vallee metric of eigenstate manifolds. We regularise the metric by a coordinate transformation and develop a formalism in which diabolic points act as bridges between adjacent eigenstate manifolds, glueing them into a single connected state manifold. We characterise the topology of this structure and refine the rules for nodal lines governing the Berry phase. The connected state manifold restores the numerical stability near diabolic points, enlarges the class of geodesics allowing for new geodesic shortcuts, and provides a new mechanism for Berry phase computation, even along paths traversing diabolic points.
format Preprint
id arxiv_https___arxiv_org_abs_2605_28351
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Quantum geometry of connected state manifolds: When diabolic points act as bridges between eigenstate manifolds
Střeleček, Jan
Novotný, Jakub
Cejnar, Pavel
Quantum Physics
Mathematical Physics
Parametric Hamiltonians often exhibit point-like spectral degeneracies (diabolic points, or conical intersections), which can lead to singularities in the Provost-Vallee metric of eigenstate manifolds. We regularise the metric by a coordinate transformation and develop a formalism in which diabolic points act as bridges between adjacent eigenstate manifolds, glueing them into a single connected state manifold. We characterise the topology of this structure and refine the rules for nodal lines governing the Berry phase. The connected state manifold restores the numerical stability near diabolic points, enlarges the class of geodesics allowing for new geodesic shortcuts, and provides a new mechanism for Berry phase computation, even along paths traversing diabolic points.
title Quantum geometry of connected state manifolds: When diabolic points act as bridges between eigenstate manifolds
topic Quantum Physics
Mathematical Physics
url https://arxiv.org/abs/2605.28351