Maxima of the index: forbidden unbalanced cycles

Abstract

This paper aims to address the problem: what is the maximum index among all C-r-free unbalanced signed graphs, where C-r is the set of unbalanced cycle of length r. Let 1 = C3- Kn-2 be a signed graph obtained by identifying a vertex of Kn-2 with a vertex of C3- whose two incident edges in C3- are all positive, where C3- is an unbalanced triangle with one negative edge. It is shown that if is an unbalanced signed graph of order n, r is an integer in \4, ·s, n3 + 1 \, and λ1() ≥ λ1(1), then contains an unbalanced cycle of length r, unless 1. ∈dent It is shown that the result are significant in spectral extremal graph problems. Because they can be regarded as a extension of the spectral Tur\'an problem for cycles [Linear Algebra Appl. 428 (2008) 1492--1498] in the context of signed graphs. Furthermore, our result partly resolved a recent open problem raised by Lin and Wang [arXiv preprint arXiv:2309.04101 (2023)].

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