How is a graph not like a manifold?

Anton Andreyevich Ayzenberg; Айзенберг Антон Андреевич; Mikiya Masuda; Масуда Микия; Grigory Dmitrievich Solomadin; Соломадин Григорий Дмитриевич

doi:10.4213/sm9798

How is a graph not like a manifold?

Authors: Ayzenberg A.A.¹, Masuda M.²^,1, Solomadin G.D.¹
Affiliations:
1. Faculty of Computer Science, National Research University "Higher School of Economics"
2. Osaka City University
Issue: Vol 214, No 6 (2023)
Pages: 41-68
Section: Articles
URL: https://journal-vniispk.ru/0368-8666/article/view/133529
DOI: https://doi.org/10.4213/sm9798
ID: 133529

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Abstract

For an equivariantly formal action of a compact torus $T$ on a smooth manifold $X$ with isolated fixed points we investigate the global homological properties of the graded poset $S (X)$ of face submanifolds. We prove that the condition of the $j$ -independency of tangent weights at each fixed point implies the $(j + 1)$ -acyclicity of the skeleta $S (X)_{r}$ for $r > j + 1$ . This result provides a necessary topological condition for a GKM graph to be a GKM graph of some GKM manifold. We use particular acyclicity arguments to describe the equivariant cohomology algebra of an equivariantly formal manifold of dimension $2 n$ with an $(n - 1)$ -independent action of the $(n - 1)$ -dimensional torus, under certain colourability assumptions on its GKM graph. This description relates the equivariant cohomology algebra to the face algebra of a simplicial poset. This observation underlines a certain similarity between actions of complexity $1$ and torus manifolds.

Keywords

torus action, invariant submanifold, homology of posets, GKM theory, homotopy colimits

References

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How is a graph not like a manifold?

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Abstract

Keywords

About the authors

Anton Andreyevich Ayzenberg

Mikiya Masuda

Grigory Dmitrievich Solomadin

References

Supplementary files