Fine Degrees of Word Problems of Cancellation Semigroups

For a natural number k ≥ 2 let ρ = ρ(k) be the smallest natural number which does not divide k -1. We show that for any subset A of a right cancellative semigroup S which contains no solutions of the equation x 1 + • • • + x k = y there is an element s in S such that the sets A, A + s, . . . , A + (

We show that if a finitely presented Rees quotient of a free inverse semigroup ww xx has polynomial growth, then its growth series is in a certain subsemiring of ‫ގ‬ z . We present a procedure for calculating the degree of growth of such a semigroup and use it to determine the possible values for th

## Abstract In some cases, the homogenization of evolution differential equations whose solution is given by the action of a semigroup on their initial data may lead to evolution problems with a completely different structure, usually integro‐differential equations whose dynamics is not defined by

We prove that there exists an amalgam of two finite 4-nilpotent semigroups such that the corresponding amalgamated product has an undecidable word problem. We also show that the problem of embeddability of finite semigroup amalgams in any semigroups and the problem of embeddability of finite semigro

Signal cancellation is a serious problem in adaptive nulling. The problem arises when the actual direction of arrival of the signal is slightly off the assumed direction of arrival. The adaptive algorithms consider the actual signal a jammer as the direction of arrival is not exactly specified. In t

## Communicated by J. Banasiak In this paper we study an application of nonlinear B-bounded semigroups introduced in a previous paper. The application is similar to the particle transport problem which led to B-bounded linear semigroups. We deal with a nonlinear particle transport problem, which c