Tur\'an problem for C2k+1--free signed graph

Abstract

In this paper, we study the Tur\'an problem for C2k+1-. Suppose that G is an unbalanced signed graph of order n with e(G) edges. Let λ1 (G) be the largest eigenvalue of G, and C2k+1- be the set of the negative cycle with length 2k+1(3 k n15). We prove that if G is a C2k+1--free unbalanced signed graph, then e(G) e(C3- · Kn-2) and λ1(G) λ1(C3- · Kn-2), with equality holding if and only if G is switching equivalent to C3- · Kn-2.

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