Twisted products of monoids

Abstract

A twisting of a monoid S is a map :S× S satisfying the identity (a,b) + (ab,c) = (a,bc) + (b,c). Together with an additive commutative monoid M, and a fixed q∈ M, this gives rise a so-called twisted product M×qS, which has underlying set M× S and multiplication (i,a)(j,b) = (i+j+(a,b)q,ab). This construction has appeared in the special cases where M is N or Z under addition, S is a diagram monoid (e.g.~partition, Brauer or Temperley-Lieb), and counts floating components in concatenated diagrams. In this paper we identify a special kind of `tight' twisting, and give a thorough structural description of the resulting twisted products. This involves characterising Green's relations, (von Neumann) regular elements, idempotents, biordered sets, maximal subgroups, Sch\"utzenberger groups, and more. We also consider a number of examples, including several apparently new ones, which take as their starting point certain generalisations of Sylvester's rank inequality from linear algebra.