Hypomorphy of graphs up to complementation
摘要
Let be a set of cardinality (possibly infinite). Two graphs and with vertex set are {\it isomorphic up to complementation} if is isomorphic to or to the complement of . Let be a non-negative integer, and are {\it -hypomorphic up to complementation} if for every -element subset of , the induced subgraphs and are isomorphic up to complementation. A graph is {\it -reconstructible up to complementation} if every graph which is -hypomorphic to up to complementation is in fact isomorphic to up to complementation. We give a partial characterisation of the set of pairs such that two graphs and on the same set of vertices are equal up to complementation whenever they are -hypomorphic up to complementation. We prove in particular that contains all pairs such that . We also prove that 4 is the least integer such that every graph having a large number of vertices is -reconstructible up to complementation; this answers a question raised by P. Ille
引用
@article{arxiv.math/0601118,
title = {Hypomorphy of graphs up to complementation},
author = {Jamel Dammak and Gérard Lopez and Maurice Pouzet and Hamza Si Kaddour},
journal= {arXiv preprint arXiv:math/0601118},
year = {2016}
}