Spectral convergence of the discrete Laplacian on models of a metrized graph.

Faber, X.W.C.

Displaying similar documents to “Spectral convergence of the discrete Laplacian on models of a metrized graph.”

Some properties of Laplacian eigenvalues for generalized star graphs

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Lower and upper bounds are obtained for the clique number $ω (G)$ and the independence number $α (G)$ , in terms of the eigenvalues of the signless Laplacian matrix of a graph $G$ .

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Spectrum of one dimensional $p$ -Laplacian operator with indefinite weight.

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A maxmin principle for nonlinear eigenvalue problems with application to a rational spectral problem in fluid-solid vibration

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In this paper we prove a maxmin principle for nonlinear nonoverdamped eigenvalue problems corresponding to the characterization of Courant, Fischer and Weyl for linear eigenproblems. We apply it to locate eigenvalues of a rational spectral problem in fluid-solid interaction.