Publication: Explicit construction of the eigenvectors and eigenvalues of the graph Laplacian on the Cayley tree
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Elsevier BV
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A generalized Fourier analysis on arbitrary graphs calls for a detailed knowledge of the eigenvectors of the graph Laplacian. Using the symmetries of the Cayley tree, we recursively construct the family of eigenvectors with exponentially growing eigenspaces, associated with eigenvalues in the lower part of the spectrum. The spectral gap decays exponentially with the tree size, for large trees. The eigenvalues and eigenvectors obey recursion relations which arise from the nested geometry of the tree. Such analytical solutions for the eigenvectors of non-periodic networks are needed to provide a firm basis for the spectral renormalization group which we have proposed earlier [A. Tuncer and A. Erzan, Phys. Rev. E {\bf 92}, 022106 (2015)]. PACS Nos. 02.10.Ox Combinatorics; graph theory, 02.10.Ud Linear algebra, 02.30 Nw Fourier analysis
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analytical structure of eigenvalues of the graph Laplacian, Graphs and linear algebra (matrices, eigenvalues, etc.), analytical structure of eigenvectors of the graph Laplacian, Fourier analysis, Graphs and abstract algebra (groups, rings, fields, etc.), Trees, Graph theory, Combinatorics, Fourier and Fourier-Stieltjes transforms and other transforms of Fourier type, generalized Fourier transform, Linear algebra, Mathematics, Condensed Matter - Statistical Mechanics, Combinatorics, Fourier analysis, Graph theory, Linear algebra