English

Limit elements in the configuration algebra for a cancellative monoid

Group Theory 2012-02-01 v1 Mathematical Physics math.MP

Abstract

We introduce two spaces Ω(Γ,G)\Omega(\Gamma,G) and Ω(PΓ,G)\Omega(P_{\Gamma,G}) of pre-partition functions and of opposite series, respectively, which are associated with a Cayley graph (Γ,G)(\Gamma,G) of a cancellative monoid Γ\Gamma with a finite generating system GG and with its growth function PΓ,G(t)P_{\Gamma,G}(t). Under mild assumptions on (Γ,G)(\Gamma,G), we introduce a fibration πΩ:Ω(Γ,G)Ω(PΓ,G)\pi_\Omega:\Omega(\Gamma,G)\to \Omega(P_{\Gamma,G}) equivariant with a Z0\Z_{\ge0}-action, which is transitive if it is of finite order. Then, the sum of pre-partition functions in a fiber is a linear combination of residues of the proportion of two growth functions PΓ,G(t)P_{\Gamma,G}(t) and PΓ,GM(t)P_{\Gamma,G}\mathcal{M}(t) attached to (Γ,G)(\Gamma,G) at the places of poles on the circle of the convergent radius.

Keywords

Cite

@article{arxiv.1201.6500,
  title  = {Limit elements in the configuration algebra for a cancellative monoid},
  author = {Kyoji Saito},
  journal= {arXiv preprint arXiv:1201.6500},
  year   = {2012}
}

Comments

77pages

R2 v1 2026-06-21T20:12:27.184Z