Spectral extremal problem on the square of -cycle

Abstract

Let C be the cycle of order . The square of C, denoted by C2, is obtained by joining all pairs of vertices with distance no more than two in C. A graph is called F-free if it does not contain F as a subgraph. Denote by ex(n,F) and spex(n,F) the maximum size and spectral radius over all n-vertex F-free graphs, respectively. The well-known Tur\'an problem asks for the ex(n,F), and Nikiforov in 2010 proposed a spectral counterpart, known as Brualdi-Solheid-Tur\'an type problem, focusing on determining spex(n,F). In this paper, we consider a Tur\'an problem on ex(n,C2) and a Brualdi--Solheid--Tur\'an type problem on spex(n,C2). We give a sharp bound of ex(n,C2) and spex(n,C2) for sufficiently large n, respectively. Moreover, in both results, we characterize the corresponding extremal graphs for any integer ≥ 6 that is not divisible by 3.