Maxima of the Q-index: forbidden 4-cycle and 5-cycle

Abstract

This paper gives tight upper bounds on the largest eigenvalue q(G) of the signless Laplacian of graphs with no 4-cycle and no 5-cycle. If n is odd, let Fn be the friendship graph of order n; if n is even, let Fn be Fn-1 with an edge hanged to its center. It is shown that if G is a graph of order n, with no 4-cycle, then q(G)<q(Fn), unless G=Fn. Let Sn,k be the join of a complete graph of order k and an independent set of order n-k. It is shown that if G is a graph of order n, with no 5-cycle, then q(G)<q(Sn,2), unless G=Sn,k. It is shown that these results are significant in spectral extremal graph problems. Two conjectures are formulated for the maximum q(G) of graphs with forbidden cycles.