Geodesic
Nordhaus-Gaddum type inequalities for Laplacian and signless Laplacian eigenvalues
The electronic journal of combinatorics, Tome 21 (2014) no. 3
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Let $G$ be a graph with $n$ vertices. We denote the largest signless Laplacian eigenvalue of $G$ by $q_1(G)$ and Laplacian eigenvalues of $G$ by $\mu_1(G)\ge\cdots\ge\mu_{n-1}(G)\ge\mu_n(G)=0$. It is a conjecture on Laplacian spread of graphs that $\mu_1(G)-\mu_{n-1}(G)\le n-1$ or equivalently $\mu_1(G)+\mu_1(\overline G)\le2n-1$. We prove the conjecture for bipartite graphs. Also we show that for any bipartite graph $G$, $\mu_1(G)\mu_1(\overline G)\le n(n-1)$. Aouchiche and Hansen [Discrete Appl. Math. 2013] conjectured that $q_1(G)+q_1(\overline G)\le3n-4$ and $q_1(G)q_1(\overline G)\le2n(n-2)$. We prove the former and disprove the latter by constructing a family of graphs $H_n$ where $q_1(H_n)q_1(\overline{H_n})$ is about $2.15n^2+O(n)$.
DOI : 10.37236/4112
Classification : 05C50
Mots-clés : signless Laplacian eigenvalues of graphs, Laplacian eigenvalues of graphs, Nordhaus-Gaddum-type inequalities, Laplacian spread 
@article{10_37236_4112,
     author = {F. Ashraf and B. Tayfeh-Rezaie},
     title = {Nordhaus-Gaddum type inequalities for {Laplacian} and signless {Laplacian} eigenvalues},
     journal = {The electronic journal of combinatorics},
     year = {2014},
     volume = {21},
     number = {3},
     doi = {10.37236/4112},
     zbl = {1300.05156},
     url = {http://geodesic.mathdoc.fr/articles/10.37236/4112/}
}
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F. Ashraf; B. Tayfeh-Rezaie. Nordhaus-Gaddum type inequalities for Laplacian and signless Laplacian eigenvalues. The electronic journal of combinatorics, Tome 21 (2014) no. 3. doi: 10.37236/4112

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