Almost disjoint large subsets of semigroups

There are several notions of largeness in a semigroup S that originated in topological dynamics. Among these are thick, central, syndetic and piecewise syndetic. Of these, central sets are especially interesting because they are partition regular and are guaranteed to contain substantial combinatorial structure. It is known that in (N, +) any central set may be partitioned into infinitely many pairwise disjoint central sets. We extend this result to a large class of semigroups (including (N, +)) by showing that if S is a semigroup in this class which has cardinality K then any central set can be partitioned into K many pairwise disjoint central sets. We also show that for this same class of semigroups, if there exists a collection of it almost disjoint subsets of any member S, then any central subset of S contains a collection of it almost disjoint central sets. The same statement applies if "central" is replaced by "thick"; and in the case that the semigroup is left cancellative, "central" may be replaced by "piecewise syndetic". The situation with respect to syndetic sets is much more restrictive. For example, there does not exist an uncountable collection of almost disjoint syndetic subsets of N. We investigate the extent to which syndetic sets can be split into disjoint syndetic sets. (C) 2007 Elsevier B.V. All rights reserved.