The minimum number of detours in a connected graph of minimum degree three

Abstract

A longest path in a graph is called a detour. Denote by a(k,n) the minimum number of detours in a connected graph with minimum degree k and order n, and denote by b(k,n) the minimum odd number of detours in such a graph. X. Zhan has posed the problem of determining a(k,n) and b(k,n). It is known that a(2,n)=4 for n 4 and b(2,n)=9 for n 9. In this paper we prove that a(3,n)=36 for n 18, a(k,n) (k!)2 for n k2+2k+3 and b(3,n) 225 for n 11. We also pose several related unsolved problems.