Sk-Holonomy on Coloring Complexes of Mn with Applications to the Poincar\'e Conjecture and 4-Color Theorem

Abstract

A natural class of coloring complexes X on closed manifold Mn is investigated that gives a holonomy map HolX: π1(M) Sn+1. By a k-multilayer complex construction the holonomy map may be defined to any finite permutation group HolX: π1(M) Sn+k, k>0. Under isotopy of X and surgery on Bn ⊂ Mn a holonomy class of complexes [X] is defined with [X]=[Y] HolX = HolY. It is also shown that for any homeomorphism f:π1(M) Sn+1 there is a complex X on M with HolX =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.