Size reconstructibility of graphs
Abstract
The deck of a graph G is given by the multiset of (unlabelled) subgraphs \G-v:v∈ V(G)\. The subgraphs G-v are referred to as the cards of G. Brown and Fenner recently showed that, for n≥29, the number of edges of a graph G can be computed from any deck missing 2 cards. We show that, for sufficiently large n, the number of edges can be computed from any deck missing at most 120n cards.
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