Factors and connected factors in tough graphs with high isolated toughness

Abstract

Let G be a graph and let f be a positive integer-valued function on V(G). Assume that for all S⊂eq V(G), Σv∈ I(G S)f(v)(f(v)+1) |S|, where I(G S) denotes the set of isolated vertices of G S. In this paper, we show that if for all S⊂eq V(G), ω(G S) Σv∈ S(f(v)-1)+1, and Σv∈ V(G)f(v) is even, then G has a factor F such that for each vertex v, dF(v)=f(v), where ω(G S) denotes the number of components of G S. Moreover, we show that if for all S⊂eq V(G), ω(G S) 14|S|+1, and f 2, then G has a connected factor H such that for each vertex v, dH(v)∈ \f(v),f(v)+1\.