The Relation between Composability and Splittability of Permutation Classes
Combinatorics
2020-12-16 v3
Abstract
A permutation class is said to be splittable if there exist two proper subclasses such that any can be red-blue colored so that the red (respectively, blue) subsequence of is order isomorphic to an element of (respectively, ). The class is said to be composable if there exists some number of proper subclasses such that any can be written as for some . We answer a question of Karpilovskij by showing that there exists a composable permutation class that is not splittable. We also give a condition under which an infinite composable class must be splittable.
Cite
@article{arxiv.1908.02731,
title = {The Relation between Composability and Splittability of Permutation Classes},
author = {Rachel Zhang},
journal= {arXiv preprint arXiv:1908.02731},
year = {2020}
}