Finsler-Laplace-Beltrami Operators with Application to Shape Analysis

Simon Weber; Thomas Dagès; Maolin Gao; Daniel Cremers

Finsler-Laplace-Beltrami Operators with Application to Shape Analysis

Simon Weber, Thomas Dagès, Maolin Gao, Daniel Cremers

Published: 01 Jan 2024, Last Modified: 27 Feb 2025CVPR 2024EveryoneRevisionsBibTeXCC BY-SA 4.0

Abstract: The Laplace-Beltrami operator (LBO) emerges from studying manifolds equipped with a Riemannian metric. It is often called the swiss army knife of geometry processing as it allows to capture intrinsic shape information and gives rise to heat diffusion, geodesic distances, and a mul-titude of shape descriptors. It also plays a central role in geometric deep learning. In this work, we explore Finsler manifolds as a generalization of Riemannian manifolds. We revisit the Finsler heat equation and derive a Finsler heat kernel and a Finsler-Laplace-Beltrami Operator (FLBO): a novel theoretically justified anisotropic Laplace-Beltrami operator (ALBO). In experimental evaluations we demon-strate that the proposed FLBO is a valuable alternative to the traditional Riemannian-based LBO and ALBOs for spa-tialfiltering and shape correspondence estimation. We hope that the proposed Finsler heat kernel and the FLBO will inspire further exploration of Finsler geometry in the Computer vision community.

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