Some properties of Higman-Thompson monoids and digital circuits

Abstract

We define various monoid versions of the R. Thompson group V, and prove connections with monoids of acyclic digital circuits. We show that the monoid M2,1 (based on partial functions) is not embeddable into Thompson's monoid totM2,1, but that totM2,1 has a submonoid that maps homomorphically onto M2,1. This leads to an efficient completion algorithm for partial functions and partial circuits. We show that the union of partial circuits with disjoint domains is an element of M2,1, and conversely, every element of M2,1 can be decomposed efficiently into a union of partial circuits with disjoint domains.