# $S_k$-Holonomy on Coloring Complexes of $M^n$ with Applications to the   Poincar\'e Conjecture and $4$-Color Theorem

**Authors:** Daniel Kling

arXiv: 1705.08029 · 2017-05-24

## TL;DR

This paper introduces a new framework using holonomy maps on coloring complexes of manifolds, linking topological properties to permutation groups, and applies it to the 4-color theorem and Poincaré conjecture.

## Contribution

It develops a novel holonomy-based approach to analyze coloring complexes on manifolds, connecting topological invariants with permutation group representations, and reformulates key conjectures in this context.

## Key findings

- Holonomy maps can be defined for coloring complexes on manifolds.
- Existence of complexes with prescribed holonomy maps for any permutation group.
- Reformulation of the 4-color theorem and Poincaré conjecture via holonomy classes.

## Abstract

A natural class of coloring complexes $X$ on closed manifold $M^n$ is investigated that gives a holonomy map $\mbox{Hol}_X: \pi_1(M) \to S_{n+1}$. By a $k$-multilayer complex construction the holonomy map may be defined to any finite permutation group   $\mbox{Hol}_X: \pi_1(M) \to S_{n+k}$, $k>0$. Under isotopy of $X$ and surgery on $B^n \subset M^n$ a holonomy class of complexes $[X]$ is defined with $[X]=[Y] \iff \mbox{Hol}_X = \mbox{Hol}_Y$. It is also shown that for any homeomorphism $f:\pi_1(M) \to S_{n+1}$ there is a complex $X$ on $M$ with $\mbox{Hol}_X =f$. These results are applied to express the $4$-color Theorem and the Poincar\'e Conjecture as the existence and uniqueness, respectively, of a certain holonomy class. Several other applications are suggested.

## Full text

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## Figures

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## References

5 references — full list in the complete paper: https://tomesphere.com/paper/1705.08029/full.md

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Source: https://tomesphere.com/paper/1705.08029