Abstract
The depth statistic was defined by Petersen and Tenner for an element of an arbitrary Coxeter group in terms of factorizations of the element into a product of reflections. It can also be defined as the minimal cost, given certain prescribed edge weights, for a path in the Bruhat graph from the identity to an element. We present algorithms for calculating the depth of an element of a classical Coxeter group that yield simple formulas for this statistic. We use our algorithms to characterize elements having depth equal to length. These are the short-braid-avoiding elements. We also give a characterization of the elements for which the reflection length coincides with both depth and length. These are the boolean elements.
| Original language | English |
|---|---|
| Pages (from-to) | 645-676 |
| Number of pages | 32 |
| Journal | Journal of Algebraic Combinatorics |
| Volume | 44 |
| Issue number | 3 |
| DOIs | |
| State | Published - 1 Nov 2016 |
| Externally published | Yes |
Bibliographical note
Publisher Copyright:© 2016, Springer Science+Business Media New York.
Funding
AW is partially supported by NSA Young Investigators Grant H98230-13-1-0242.
| Funders | Funder number |
|---|---|
| National Security Agency | H98230-13-1-0242 |
Keywords
- Bruhat graph
- Coxeter groups
- Depths
- Length
- Reflections