# The Möbius Function of Generalized Subword Order

## Publication Date

3-20-2012

## Description

Let *P* be a poset and let *P*^{⁎} be the set of all finite length words over *P*. Generalized subword order is the partial order on *P*^{⁎} obtained by letting *u*⩽*w* if and only if there is a subword *u*^{′} of *w* having the same length as *u* such that each element of *u* is less than or equal to the corresponding element of *u*^{′} in the partial order on *P*. Classical subword order arises when *P* is an antichain, while letting *P* be a chain gives an order on compositions. For any finite poset *P*, we give a simple formula for the Möbius function of *P*^{⁎} in terms of the Möbius function of *P*. This permits us to rederive in an easy and uniform manner previous results of Björner, Sagan and Vatter, and Tomie. We are also able to determine the homotopy type of all intervals in *P*^{⁎} for any finite *P* of rank at most 1.

## Journal

Advances in Mathematics

## Volume

229

## Issue

5

## First Page

2741

## Last Page

2766

## Department

Mathematics

## Link to Published Version

http://www.sciencedirect.com/science/article/pii/S0001870812000436

## Recommended Citation

McNamara, Peter R. W. and Sagan, Bruce Eli. "The Möbius Function of Generalized Subword Order." *Advances in Mathematics* (2012)
: 2741-2766.