The maximum size of a graph with prescribed order, circumference and minimum degree

Abstract

Erdos determined the maximum size of a nonhamiltonian graph of order n and minimum degree at least k in 1962. Recently, Ning and Peng generalized. Erdos' work and gave the maximum size h(n,c,k) of graphs with prescribed order n, circumference c and minimum degree at least k. But for some triples n,c,k, the maximum size is not attained by a graph of minimum degree k. For example, h(15,14,3)=77 is attained by a unique graph of minimum degree 7, not 3. In this paper we obtain more precise information by determining the maximum size of a graph with prescribed order, circumference and minimum degree. Consequently we solve the corresponding problem for longest paths. All these results on the size of graphs have clique versions.