On the minimal degree condition of graphs implying some properties of subgraphs

Abstract

Erdos posed the problem of finding conditions on a graph G that imply the largest number of edges in a triangle-free subgraph is equal to the largest number of edges in a bipartite subgraph. We generalize this problem to general cases. Let δr be the least number so that any graph G on n vertices with minimum degree δrn has the property Pr-1(G)=Krf(G), where Pr-1(G) is the largest number of edges in an (r-1)-partite subgraph and Krf(G) is the largest number of edges in a Kr-free subgraph. We show that 3r-43r-1<δr4(3r-7)(r-1)+14(r-2)(3r-4) when r4. In particular, δ4 0.9415.