Saved in:
Bibliographic Details
Main Author: Cocos, Mihail
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2506.14778
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866915483736866816
author Cocos, Mihail
author_facet Cocos, Mihail
contents We establish that any affine manifold $(M,\nabla)$ endowed with a parallel volume form $ω,$ admits, in any conformal class of Riemannian metrics, a representative $H$ for which $\nabla$ is the Levi-Civita connection. This provides a constructive proof that such manifolds are necessarily complete, generalizing the "if" direction of Markus' conjecture \cite{markus1962}. Moreover, our result demonstrates that these structures are intrinsically Riemannian-flat, a stronger conclusion than the affine completeness asserted by Markus. The metric $H$ arises naturally from the Hessian of volume-normalized distance functions and is shown to be globally smooth and $\nabla$-parallel, extending results of \cite{goldman1982} and \cite{benzecri1955} to higher dimensions with additional geometric structure. The construction proceeds through three technically novel steps: (1) local parallel metric normalization using the given volume form, (2) explicit Hessian calculations in adapted coordinates, and (3) gluing via affine transition maps that preserve the volumetric geometry. This approach reveals an unexpected rigidity in flat affine manifolds with compatible volume that goes beyond the topological constraints studied in \cite{fried1980}.
format Preprint
id arxiv_https___arxiv_org_abs_2506_14778
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A Riemannian Characterization of Compact Affine Manifolds with Parallel Volume
Cocos, Mihail
Differential Geometry
We establish that any affine manifold $(M,\nabla)$ endowed with a parallel volume form $ω,$ admits, in any conformal class of Riemannian metrics, a representative $H$ for which $\nabla$ is the Levi-Civita connection. This provides a constructive proof that such manifolds are necessarily complete, generalizing the "if" direction of Markus' conjecture \cite{markus1962}. Moreover, our result demonstrates that these structures are intrinsically Riemannian-flat, a stronger conclusion than the affine completeness asserted by Markus. The metric $H$ arises naturally from the Hessian of volume-normalized distance functions and is shown to be globally smooth and $\nabla$-parallel, extending results of \cite{goldman1982} and \cite{benzecri1955} to higher dimensions with additional geometric structure. The construction proceeds through three technically novel steps: (1) local parallel metric normalization using the given volume form, (2) explicit Hessian calculations in adapted coordinates, and (3) gluing via affine transition maps that preserve the volumetric geometry. This approach reveals an unexpected rigidity in flat affine manifolds with compatible volume that goes beyond the topological constraints studied in \cite{fried1980}.
title A Riemannian Characterization of Compact Affine Manifolds with Parallel Volume
topic Differential Geometry
url https://arxiv.org/abs/2506.14778