On partition and almost disjoint properties of combinatorial notions

Abstract

It is known that there are many notions of largeness in a semigroup that own rich combinatorial properties. In this paper, we focus on partition and almost disjoint properties of these notions. One of the most remarkable results with respect to this topic is that in an infinite very weakly cancellative semigroup of size , every central set can be split into disjoint central subsets. Moreover, if contains λ almost disjoint subsets, then every central set contains a family of λ almost disjoint central subsets. And many other combinatorial notions are found successively to have analogous properties, among these are thick sets, piecewise syndetic sets, J-sets and C-sets. In this paper, we mainly study four other notions: IP sets, combinatorially rich sets, Cp-sets and PP-rich sets. Where the latter two are known in (N, +), related to the polynomial extension of the central sets theorem. We lift them up to commutative cancellative semigroups and obtain an uncountable version of the polynomial extension of the central sets theorem incidentally. And we finally find that the infinite partition and almost disjoint properties hold for Cp-sets in commutative cancellative semigroups and for other three notions in (N, +).