Maximizing the signless Laplacian spectral radius of some theta graphs
Abstract
Let Q(G)=D(G)+A(G) be the signless Laplacian matrix of a simple graph G, where D(G) and A(G) are the degree diagonal matrix and the adjacency matrix of G, respectively. The largest eigenvalue of Q(G), denoted by q(G), is called the signless Laplacian spectral radius of G. Let θ(l1,l2,l3) denote the theta graph which consists of two vertices connected by three internally disjoint paths with length l1, l2 and l3. Let Fn be the friendship graph consisting of n-12 triangles which intersect in exactly one common vertex for odd n≥3 and obtained by hanging an edge to the center of Fn-1 for even n≥4. Let Sn,k denote the graph obtained by joining each vertex of Kk to n-k isolated vertices. Let Sn,k+ denote the graph obtained by adding an edge to the two isolated vertices of Sn,k. In this paper, firstly, we show that if G is θ(1,2,2)-free, then q(G)≤ q(Fn), unless G Fn. Secondly, we show that if G is θ(1,2,3)-free, then q(G)≤ q(Sn,2), unless G Sn,2. Finally, we show that if G is \θ(1,2,2),F5\-free, then q(G)≤ q(Sn,1+), unless G Sn,1+.
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