For an integer k 0, a connected graph G is called a k-cactus graph if each edge e E (G) is contained in at most k cycles of G. Inspired by the Brualdi-Solheid problem, in this paper, we address the problem of determining the maximum spectral radius of k-cactus graphs. Lov\'asz and Pelik\'an (1973), Borovi\'canin and Petrovi\'c (2006) resolved the cases of k=0 and k=1, respectively. We solve this problem for the cases of k=2 and k=3, that is the graphs with the maximum spectral radius among all 2-cactus graphs and 3-cactus graphs are determined, respectively.
Wu et al. (Mon,) studied this question.