On the sizes of generalized cactus graphs

Abstract

A cactus is a connected graph in which each edge is contained in at most one cycle. We generalize the concept of cactus graphs, i.e., a k-cactus is a connected graph in which each edge is contained in at most k cycles where k 1. It is well known that every cactus with n vertices has at most 32(n-1) edges. Inspired by it, we attempt to establish analogous upper bounds for general k-cactus graphs. In this paper, we first characterize k-cactus graphs for 2 k 4 based on the block decompositions. Subsequently, we give tight upper bounds on their sizes. Moreover, the corresponding extremal graphs are also characterized. However, the case of k 5 remains open. For the case of 2-connectedness, the range of k is expanded to all positive integers in our research. We prove that every 2-connected k ~( 1)-cactus graphs with n vertices has at most n+k-1 edges, and the bound is tight if n k + 2. But, for n < k+1, determining best bounds remains a mystery except for some small values of k.