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 c ≥ 1 of deletion: 1) GI liso VDCc, GI liso EDCc, GI ≤lm LVDc, and GI piso LEDc. 2) For all k ≥ 2, GI piso k-VDCc and GI piso k-EDCc. 3) For all k ≥ 2, GI ≤lm k-LVDc. 4)GI piso 2-LVCc. 5) For all k ≥ 2, GI piso k-LEDc. For many of these results, even the c = 1 case was not previously known. Similar to the definition of reconstruction numbers vrn∃(G) [HP85] and ern∃(G) (see page 120 of [LS03]), we introduce two new graph parameters, vrn∀(G) and ern∀(G), and give an example of a family \Gn\n ≥ 4 of graphs on n vertices for which vrn∃(Gn) < vrn∀(Gn). For every k ≥ 2 and n ≥ 1, we show that there exists a collection of k graphs on (2k-1+1)n+k vertices with 2n 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.
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