-
Peter Allen
-
Jozef Skokan
-
Andreas Würfl
Keywords:
Extremal graph theory, Planar graphs
Abstract
Kühn, Osthus and Taraz showed that for each $\gamma>0$ there exists $C$ such that any $n$-vertex graph with minimum degree $\gamma n$ contains a planar subgraph with at least $2n-C$ edges. We find the optimum value of $C$ for all $\gamma< 1/2$ and sufficiently large $n$.
