Efficient Isomorphism for $S_d$-graphs and $T$-graphs
Abstract
An -graph is one representable as the intersection graph of connected subgraphs of a suitable subdivision of a fixed graph , introduced by Bir\'{o}, Hujter and Tuza (1992). An -graph is proper if the representing subgraphs of can be chosen incomparable by the inclusion. In this paper, we focus on the isomorphism problem for -graphs and -graphs, where is the star with rays and is an arbitrary fixed tree. Answering an open problem of Chaplick, T\"{o}pfer, Voborn\'{\i}k and Zeman (2016), we provide an FPT-time algorithm for testing isomorphism and computing the automorphism group of -graphs when parameterized by~, which involves the classical group-computing machinery by Furst, Hopcroft, and Luks (1980). We also show that the isomorphism problem of -graphs is at least as hard as the isomorphism problem of posets of bounded width, for which no efficient combinatorial-only algorithm is known to date. Then we extend our approach to an XP-time algorithm for isomorphism of -graphs when parameterized by the size of . Lastly, we contribute a simple FPT-time combinatorial algorithm for isomorphism testing in the special case of proper - and -graphs.
Keywords
Cite
@article{arxiv.1907.01495,
title = {Efficient Isomorphism for $S_d$-graphs and $T$-graphs},
author = {Deniz Ağaoğlu Çağırıcı and Petr Hliněný},
journal= {arXiv preprint arXiv:1907.01495},
year = {2022}
}