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Autori principali: Bell, Okezue, Bell, Anthony
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2405.09748
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author Bell, Okezue
Bell, Anthony
author_facet Bell, Okezue
Bell, Anthony
contents Endothelial cells form the linchpin of vascular and lymphatic systems, creating intricate networks that are pivotal for angiogenesis, controlling vessel permeability, and maintaining tissue homeostasis. Despite their critical roles, there is no rigorous mathematical framework to represent the connectivity structure of endothelial networks. Here, we develop a pioneering mathematical formalism called $π$-graphs to model the multi-type junction connectivity of endothelial networks. We define $π$-graphs as abstract objects consisting of endothelial cells and their junction sets, and introduce the key notion of $π$-isomorphism that captures when two $π$-graphs have the same connectivity structure. We prove several propositions relating the $π$-graph representation to traditional graph-theoretic representations, showing that $π$-isomorphism implies isomorphism of the corresponding unnested endothelial graphs, but not vice versa. We also introduce a temporal dimension to the $π$-graph formalism and explore the evolution of topological invariants in spatial embeddings of $π$-graphs. Finally, we outline a topological framework to represent the spatial embedding of $π$-graphs into geometric spaces. The $π$-graph formalism provides a novel tool for quantitative analysis of endothelial network connectivity and its relation to function, with the potential to yield new insights into vascular physiology and pathophysiology.
format Preprint
id arxiv_https___arxiv_org_abs_2405_09748
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle A Mathematical Reconstruction of Endothelial Cell Networks
Bell, Okezue
Bell, Anthony
Cell Behavior
Combinatorics
Group Theory
Quantitative Methods
Endothelial cells form the linchpin of vascular and lymphatic systems, creating intricate networks that are pivotal for angiogenesis, controlling vessel permeability, and maintaining tissue homeostasis. Despite their critical roles, there is no rigorous mathematical framework to represent the connectivity structure of endothelial networks. Here, we develop a pioneering mathematical formalism called $π$-graphs to model the multi-type junction connectivity of endothelial networks. We define $π$-graphs as abstract objects consisting of endothelial cells and their junction sets, and introduce the key notion of $π$-isomorphism that captures when two $π$-graphs have the same connectivity structure. We prove several propositions relating the $π$-graph representation to traditional graph-theoretic representations, showing that $π$-isomorphism implies isomorphism of the corresponding unnested endothelial graphs, but not vice versa. We also introduce a temporal dimension to the $π$-graph formalism and explore the evolution of topological invariants in spatial embeddings of $π$-graphs. Finally, we outline a topological framework to represent the spatial embedding of $π$-graphs into geometric spaces. The $π$-graph formalism provides a novel tool for quantitative analysis of endothelial network connectivity and its relation to function, with the potential to yield new insights into vascular physiology and pathophysiology.
title A Mathematical Reconstruction of Endothelial Cell Networks
topic Cell Behavior
Combinatorics
Group Theory
Quantitative Methods
url https://arxiv.org/abs/2405.09748