IP set in product space of countable adequate commutative partial semigroups

Abstract

A partial semigroup is a set with restricted binary operation. In this work we will extend a result due to V. Bergelson and N. Hindman concerning the rich structure presented in the product space of semigroups to partial semigroup. An IP set in a semigroup is a set that intersect every set of the form \ FS(xn)n=1∞:xn∈ S\ . V. Bergelson and N. Hindman proved that if S1,S2,…,Sl are finite collection of commutative semigroup, then under certain condition, an IP set in S1× S2×…× Sl contains cartesian products of arbitrarily large finite substructures of the form FS(x1,n)n=1∞× FS(x2,n)n=1∞×…× FS(xl,n)n=1∞. In this work we will extend this result to countable adequate commutative partial semigroup.