When Schrier transversals grow wild
Abstract
Schreier formula for the rank of a subgroup of finite index of a finitely generated free group is generalized to an arbitrary (even infinitely generated) subgroup through the Schreier transversals of in . The rank formula may also be expressed in terms of the cogrowth of . We introduce the rank-growth function of a subgroup of a finitely generated free group . is defined to be the rank of the subgroup of generated by elements of length less than or equal to (with respect to the generators of ), and it equals the rank of the fundamental group of the subgraph of the cosets graph of , which consists of the paths starting at that are of length . When is supnormal, i.e. contains a non-trivial normal subgroup of , we show that its rank-growth is equivalent to the cogrowth of . A special case of this is the known result that a supnormal subgroup of is of finite index if and only if it is finitely generated. In particular, when is normal then the growth of the group is equivalent to the rank-growth of . A Schreier transversal forms a spanning tree of the cosets graph of , and thus its topological structure is of a contractible spanning subcomplex of a simplicial complex. The -dimensional simplicial complexes that contain contractible spanning subcomplexes have the homotopy type of a bouquet of -spheres. When these complexes are also -regular then can be computed by generalizing the rank formula (which applies to Schreier transversals) to higher dimensions.
Keywords
Cite
@article{arxiv.math/9412203,
title = {When Schrier transversals grow wild},
author = {Amnon Rosenmann},
journal= {arXiv preprint arXiv:math/9412203},
year = {2008}
}
Comments
LaTex, 12 pages, no figures