Let us say I have a symmetric graph adjacency matrix $A$, a degree matrix $D$, a Laplacian $L(=D-A)$. I have a generalized eigenvalue equation $Av=\lambda Lv$. Do the eigenvalues/vectors produced in this way have any graph theoretic interpretations?
2026-03-25 03:22:51.1774408971
Interpretation of generalized eigenvalue/vectors in spectral graph theory
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