Reconstruction from smaller cards

Abstract

The -deck of a graph G is the multiset of all induced subgraphs of G on vertices. We say that a graph is reconstructible from its -deck if no other graph has the same -deck. In 1957, Kelly showed that every tree with n3 vertices can be reconstructed from its (n-1)-deck, and Giles strengthened this in 1976, proving that trees on at least 6 vertices can be reconstructed from their (n-2)-decks. Our main theorem states that trees are reconstructible from their (n-r)-decks for all r n/9+o(n), making substantial progress towards a conjecture of N\'ydl from 1990. In addition, we can recognise the connectedness of a graph from its -deck when 9n/10, and reconstruct the degree sequence when 2n(2n). All of these results are significant improvements on previous bounds.