Induced 2-degenerate Subgraphs of Triangle-free Planar Graphs

Abstract

A graph is k-degenerate if every subgraph has minimum degree at most k. We provide lower bounds on the size of a maximum induced 2-degenerate subgraph in a triangle-free planar graph. We denote the size of a maximum induced 2-degenerate subgraph of a graph G by α2(G). We prove that if G is a connected triangle-free planar graph with n vertices and m edges, then α2(G) ≥ 6n - m - 15. By Euler's Formula, this implies α2(G) ≥ 45n. We also prove that if G is a triangle-free planar graph on n vertices with at most n3 vertices of degree at most three, then α2(G) ≥ 78n - 18 n3.