Finding a reconfiguration sequence between longest increasing subsequences
Abstract
In this note, we consider the problem of finding a step-by-step transformation between two longest increasing subsequences in a sequence, namely Longest Increasing Subsequence Reconfiguration. We give a polynomial-time algorithm for deciding whether there is a reconfiguration sequence between two longest increasing subsequences in a sequence. This implies that Independent Set Reconfiguration and Token Sliding are polynomial-time solvable on permutation graphs, provided that the input two independent sets are largest among all independent sets in the input graph. We also consider a special case, where the underlying permutation graph of an input sequence is bipartite. In this case, we give a polynomial-time algorithm for finding a shortest reconfiguration sequence (if it exists).
Cite
@article{arxiv.2310.01066,
title = {Finding a reconfiguration sequence between longest increasing subsequences},
author = {Yuuki Aoike and Masashi Kiyomi and Yasuaki Kobayashi and Yota Otachi},
journal= {arXiv preprint arXiv:2310.01066},
year = {2023}
}
Comments
6 pages