Please use this identifier to cite or link to this item: https://scidar.kg.ac.rs/handle/123456789/12122
Title: Cacti Whose Spread is Maximal
Authors: Aleksić Lampert, Tatjana
Petrovic M.
Issue Date: 2015
Abstract: © 2013, Springer Japan. For a simple graph G, the graph’s spread s(G) is defined as the difference between the largest eigenvalue and the least eigenvalue of the graph’s adjacency matrix, i.e. (formula presented) (formula presented). A connected graph G is a cactus if any two of its cycles have at most one common vertex. If all cycles of the cactus G have exactly one common vertex then it is called a bundle. Let (formula presented) denote the class of cacti with n vertices and k cycles. In this paper, we determine a unique cactus whose spread is maximal among the cacti with n vertices and k cycles. We prove that the obtained graph is a bundle of a special form. Within the class (formula presented) (formula presented) we also present a unique cactus whose least eigenvalue is minimal (Petrović et al. in Linear Algebra Appl 435:2357–2364, 2011) and show that these two graphs are the same, except for a few cases in which n is small.
URI: https://scidar.kg.ac.rs/handle/123456789/12122
Type: article
DOI: 10.1007/s00373-013-1373-1
ISSN: 0911-0119
SCOPUS: 2-s2.0-84943589100
Appears in Collections:Faculty of Science, Kragujevac

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