Chain enumeration of k-divisible noncrossing partitions of classical types

Abstract

We give combinatorial proofs of the formulas for the number of multichains in the k-divisible noncrossing partitions of classical types with certain conditions on the rank and the block size due to Krattenthaler and M\"uller. We also prove Armstrong's conjecture on the zeta polynomial of the poset of k-divisible noncrossing partitions of type A invariant under a 180 rotation in the cyclic representation.