Complexity Results in Graph Reconstruction
Abstract
We investigate the relative complexity of the graph isomorphism problem (GI) and problems related to the reconstruction of a graph from its vertex-deleted or edge-deleted subgraphs (in particular, deck checking (DC) and legitimate deck (LD) problems). We show that these problems are closely related for all amounts of deletion: 1) , , , and . 2) For all , and . 3) For all , . 4). 5) For all , . For many of these results, even the case was not previously known. Similar to the definition of reconstruction numbers [HP85] and (see page 120 of [LS03]), we introduce two new graph parameters, and , and give an example of a family of graphs on vertices for which . For every and , we show that there exists a collection of graphs on vertices with 1-vertex-preimages, i.e., one has families of graph collections whose number of 1-vertex-preimages is huge relative to the size of the graphs involved.
Keywords
Cite
@article{arxiv.cs/0410021,
title = {Complexity Results in Graph Reconstruction},
author = {Edith Hemaspaandra and Lane A. Hemaspaandra and Stanislaw P. Radziszowski and Rahul Tripathi},
journal= {arXiv preprint arXiv:cs/0410021},
year = {2007}
}