English

Eulerian cube complexes and reciprocity

Group Theory 2016-01-20 v3

Abstract

Let GG be the fundamental group of a compact nonpositively curved cube complex YY. With respect to a basepoint xx, one obtains an integer-valued length function on GG by counting the number of edges in a minimal length edge-path representing each group element. The growth series of GG with respect to xx is then defined to be the power series Gx(t)=gtgG_x(t)=\sum_g t^{|g|} where g|g| denotes the length of gg. Using the fact that GG admits a suitable automatic structure, Gx(t)G_x(t) can be shown to be a rational function. We prove that if YY is a manifold of dimension nn, then this rational function satisfies the reciprocity formula Gx(t1)=(1)nGx(t)G_x(t^{-1})=(-1)^n G_x(t). We prove the formula in a more general setting, replacing the group with the fundamental groupoid, replacing the growth series with the characteristic series for a suitable regular language, and only assuming YY is Eulerian.

Keywords

Cite

@article{arxiv.1309.7018,
  title  = {Eulerian cube complexes and reciprocity},
  author = {Richard Scott},
  journal= {arXiv preprint arXiv:1309.7018},
  year   = {2016}
}

Comments

Minor corrections. To appear in Algebraic and Geometric Topology

R2 v1 2026-06-22T01:34:59.268Z