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Bibliographic Details
Main Authors: de Badyn, Mathias Hudoba, Summers, Tyler
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2602.03763
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author de Badyn, Mathias Hudoba
Summers, Tyler
author_facet de Badyn, Mathias Hudoba
Summers, Tyler
contents Simplicial complexes are generalizations of graphs that describe higher-order network interactions among nodes in the graph. Network dynamics described by graph Laplacian flows have been widely studied in network science and control theory, and these can be generalized to simplicial complexes using Hodge Laplacians. We study weighted Hodge Laplacian flows on simplicial complexes. In particular, we develop a framework for weighted consensus dynamics based on weighted Hodge Laplacian flows and show some decomposition results for weighted Hodge Laplacians. We then show that two key spectral functions of the weighted Hodge Laplacians, the trace of the pseudoinverse and the smallest non-zero eigenvalue, are jointly convex in upper and lower simplex weights and can be formulated as semidefinite programs. Thus, globally optimal weights can be efficiently determined to optimize flows in terms of these functions. Numerical experiments demonstrate that optimal weights can substantially improve these metrics compared to uniform weights.
format Preprint
id arxiv_https___arxiv_org_abs_2602_03763
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Optimizing Weighted Hodge Laplacian Flows on Simplicial Complexes
de Badyn, Mathias Hudoba
Summers, Tyler
Optimization and Control
Simplicial complexes are generalizations of graphs that describe higher-order network interactions among nodes in the graph. Network dynamics described by graph Laplacian flows have been widely studied in network science and control theory, and these can be generalized to simplicial complexes using Hodge Laplacians. We study weighted Hodge Laplacian flows on simplicial complexes. In particular, we develop a framework for weighted consensus dynamics based on weighted Hodge Laplacian flows and show some decomposition results for weighted Hodge Laplacians. We then show that two key spectral functions of the weighted Hodge Laplacians, the trace of the pseudoinverse and the smallest non-zero eigenvalue, are jointly convex in upper and lower simplex weights and can be formulated as semidefinite programs. Thus, globally optimal weights can be efficiently determined to optimize flows in terms of these functions. Numerical experiments demonstrate that optimal weights can substantially improve these metrics compared to uniform weights.
title Optimizing Weighted Hodge Laplacian Flows on Simplicial Complexes
topic Optimization and Control
url https://arxiv.org/abs/2602.03763