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Autori principali: Aksoy, Sinan G., Young, Stephen J.
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2504.10624
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author Aksoy, Sinan G.
Young, Stephen J.
author_facet Aksoy, Sinan G.
Young, Stephen J.
contents We propose a Laplacian based on general inner product spaces, which we call the inner product Laplacian. We show the combinatorial and normalized graph Laplacians, as well as other Laplacians for hypergraphs and directed graphs, are special cases of the inner product Laplacian. After developing the necessary basic theory for the inner product Laplacian, we establish generalized analogs of key isoperimetric inequalities, including the Cheeger inequality and expander mixing lemma. Dirichlet and Neumann subgraph eigenvalues may also be recovered as appropriate limit points of a sequence of inner product Laplacians. In addition to suggesting a new context through which to examine existing Laplacians, this generalized framework is also flexible in applications: through choice of an inner product on the vertices and edges of a graph, the inner product Laplacian naturally encodes both combinatorial structure and domain-knowledge.
format Preprint
id arxiv_https___arxiv_org_abs_2504_10624
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Re-imagining Spectral Graph Theory
Aksoy, Sinan G.
Young, Stephen J.
Combinatorics
Discrete Mathematics
05C50 (Primary)
We propose a Laplacian based on general inner product spaces, which we call the inner product Laplacian. We show the combinatorial and normalized graph Laplacians, as well as other Laplacians for hypergraphs and directed graphs, are special cases of the inner product Laplacian. After developing the necessary basic theory for the inner product Laplacian, we establish generalized analogs of key isoperimetric inequalities, including the Cheeger inequality and expander mixing lemma. Dirichlet and Neumann subgraph eigenvalues may also be recovered as appropriate limit points of a sequence of inner product Laplacians. In addition to suggesting a new context through which to examine existing Laplacians, this generalized framework is also flexible in applications: through choice of an inner product on the vertices and edges of a graph, the inner product Laplacian naturally encodes both combinatorial structure and domain-knowledge.
title Re-imagining Spectral Graph Theory
topic Combinatorics
Discrete Mathematics
05C50 (Primary)
url https://arxiv.org/abs/2504.10624