On Groups Gnk and nk: A Study of Manifolds, Dynamics, and Invariants

Abstract

Recently the first named author defined a 2-parametric family of groups Gnk. Those groups may be regarded as analogues of braid groups. Study of the connection between the groups Gnk and dynamical systems led to the discovery of the following fundamental principle: If dynamical systems describing the motion of n particles possess a nice codimension 1 property governed by exactly k particles, then these dynamical systems admit a topological invariant valued in Gnk. The Gnk groups have connections to different algebraic structures. Study of the Gnk groups led to, in particular, the construction of invariants, valued in free products of cyclic groups. All generators of the Gnk groups are reflections but there are many ways to enhance them to get rid of 2-torsion. Later the first and the fourth named authors introduced and studied the second family of groups, denoted by nk, which are closely related to triangulations of manifolds. The spaces of triangulations of a given manifolds have been widely studied. Theorem of Pachner says that any two triangulations of a given manifold can be connected by a sequence of bistellar moves or Pachner moves. nk naturally appear when considering the set of triangulations with the fixed number of points. There are two ways of introducing nk: the geometrical one, which depends on the metric, and the topological one. The second one can be thought of as a braid group of the manifold and is an invariant of the topological type of manifold; in a similar way, one can construct the smooth version. In the present paper we give a survey of the ideas lying in the foundation of the Gnk and nk theories and give an overview of recent results in the study of those groups, manifolds, dynamical systems, knot and braid theories.