Chains, Antichains, and Complements in Infinite Partition Lattices

Abstract

We consider the partition lattice on any set of transfinite cardinality and properties of whose analogues do not hold for finite cardinalities. Assuming the Axiom of Choice we prove: (I) the cardinality of any maximal well-ordered chain is always exactly ; (II) there are maximal chains in of cardinality > ; (III) if, for every cardinal λ < , we have 2λ < 2, there exists a maximal chain of cardinality < 2 (but ) in 2; (IV) every non-trivial maximal antichain in has cardinality between and 2, and these bounds are realized. Moreover we can construct maximal antichains of cardinality (, 2λ) for any λ ; (V) all cardinals of the form λ with 0 λ occur as the number of complements to some partition P ∈ , and only these cardinalities appear. Moreover, we give a direct formula for the number of complements to a given partition; (VI) Under the Generalized Continuum Hypothesis, the cardinalities of maximal chains, maximal antichains, and numbers of complements are fully determined, and we provide a complete characterization.