Subword counting and the incidence algebra

Abstract

The Pascal matrix, P, is an upper diagonal matrix whose entries are the binomial coefficients. In 1993 Call and Velleman demonstrated that it satisfies the beautiful relation P=(H) in which H has the numbers 1, 2, 3, etc. on its superdiagonal and zeros elsewhere. We generalize this identity to the incidence algebras I(A*) and I(S) of functions on words and permutations, respectively. In I(A*) the entries of P and H count subwords; in I(S) they count permutation patterns. Inspired by vincular permutation patterns we define what it means for a subword to be restricted by an auxiliary index set R; this definition subsumes both factors and (scattered) subwords. We derive a theorem for words corresponding to the Reciprocity Theorem for patterns in permutations: Up to sign, the coefficients in the Mahler expansion of a function counting subwords restricted by the set R is given by a function counting subwords restricted by the complementary set Rc.