The deck of a graph $G$ is given by the multiset of (unlabelled) subgraphs
$\{G-v:v\in V(G)\}$. The subgraphs $G-v$ are referred to as the cards of $G$.
Brown and Fenner recently showed that, for $n\geq29$, 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 $\frac1{20}\sqrt{n}$ cards.Comment: 15 page

Alex Scott

Asciak K.

Bondy J.

Carla Groenland

Hannah Guggiari

Müller V.

Nash‐Williams C.

Ulam S.

English

arXiv

The deck of a graph $G$ is given by the multiset of (unlabelled) subgraphs
$\{G-v:v\in V(G)\}$. The subgraphs $G-v$ are referred to as the cards of $G$.
Brown and Fenner recently showed that, for $n\geq29$, 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 $\frac1{20}\sqrt{n}$ cards

Groenland, Carla

Guggiari, Hannah

Scott, Alex

Oxford University Research Archive

Size reconstructibility of graphs

ORA - Oxford University Research Archive

Crossref

The deck of a graph (Formula presented.) is given by the multiset of (unlabeled) subgraphs (Formula presented.). The subgraphs (Formula presented.) are referred to as the cards of (Formula presented.). Brown and Fenner recently showed that, for (Formula presented.), the number of edges of a graph (Formula presented.) can be computed from any deck missing 2 cards. We show that, for sufficiently large (Formula presented.), the number of edges can be computed from any deck missing at most (Formula presented.) cards

Utrecht University Repository

https://dspace.library.uu.nl/bitstream/1874/410372/1/jgt.22616.pdf

Size reconstructibility of graphs

Abstract

Similar works

Full text

Available Versions

Oxford University Research Archive

ORA - Oxford University Research Archive

Crossref

Utrecht University Repository