Construction of a quotient ring of Z2F in which a binomial 1 + w is invertible using small cancellation methods

Abstract

We apply small cancellation methods originating from group theory to investigate the structure of a quotient ring Z2F / I, where Z2F is the group algebra of the free group F over the field Z2, and the ideal I is generated by a single trinomial 1 + v + vw, where v is a complicated word depending on w. In Z2F / I we have (1 + w)-1 = v, so 1 + w becomes invertible. We construct an explicit linear basis of Z2F / I (thus showing that Z2F / I≠ 0). This is the first step in constructing rings with exotic properties.