Rationality, irrationality, and Wilf equivalence in generalized factor order

TL;DR

This paper studies generalized factor order on words over posets, proving automaton acceptance and rationality of generating functions, and explores Wilf equivalence and the potential irrationality of related generating functions.

Contribution

It extends known results to generalized factor order, establishes automaton recognition, rationality of generating functions, and analyzes Wilf equivalence and irrationality in this context.

Findings

Languages (u) are accepted by finite automata

Generating functions F(u) are rational for finite P

The function M(u) can be irrational due to the Pumping Lemma

Abstract

Let $P$ be a partially ordered set and consider the free monoid $P^*$ of all words over $P$. If $w,w'\in P^*$ then $w'$ is a factor of $w$ if there are words $u,v$ with $w=uw'v$. Define generalized factor order on $P^*$ by letting $u\le w$ if there is a factor $w'$ of $w$ having the same length as $u$ such that $u\le w'$, where the comparison of $u$ and $w'$ is done componentwise using the partial order in $P$. One obtains ordinary factor order by insisting that $u=w'$ or, equivalently, by taking $P$ to be an antichain. Given $u\in P^*$, we prove that the language $\cF(u)=\{w : w\ge u\}$ is accepted by a finite state automaton. If $P$ is finite then it follows that the generating function $F(u)=\sum_{w\ge u} w$ is rational. This is an analogue of a theorem of Bj\"orner and Sagan for generalized subword order. We also consider $P=\bbP$, the positive integers with the usual total order, so that $P^*$ is the set of compositions. In this case one obtains a weight generating function $F(u;t,x)$ by substituting $tx^n$ each time $n\in\bbP$ appears in $F(u)$. We show that this generating function is also rational by using the transfer-matrix method. Words $u,v$ are said to be Wilf equivalent if $F(u;t,x)=F(v;t,x)$ and we prove various Wilf equivalences combinatorially. Bj\"orner found a recursive formula for the M\"obius function of ordinary factor order on $P^*$. It follows that one always has $\mu(u,w)=0,\pm1$. Using the Pumping Lemma we show that the generating function $M(u)=\sum_{w\ge u} |\mu(u,w)| w$ can be irrational.