Transcription of Spectral and Algebraic Graph Theory
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Spectral and Algebraic Graph Theory
Spectral and Algebraic Graph TheoryIncomplete Draft, dated December 4, 2019 Current version available A. SpielmanYale UniversityCopyrightc 2019 by Daniel A. Spielman. All rights ListPrefacevContentsviNotationxxiiI Introduction and Background11 Introduction22 Eigenvalues and Optimization: The Courant-Fischer Theorem213 The Laplacian and Graph Drawing274 Adjacency matrices, Eigenvalue Interlacing, and the Perron-Frobenius Theorem 325 Comparing Graphs39II The Zoo of Graphs466 Fundamental Graphs477 Cayley Graphs558 Eigenvalues of Random Graphs639 Strongly Regular Graphs73iCHAPTER LISTiiIII Physical Metaphors8210 Random Walks on Graphs8311 Walks, Springs, and Resistor Networks9312 Effective Resistance and Schur Complements10113 Random Spanning Trees11014 Approximating Effective Resistances11715 Tutte s Theorem: How to draw a graph12216 The Lov`asz - Simonovits Approach to Random Walks13017 Monotonicity and its Failures13518 Dynamic and Nonlinear Networks143IV Spectra and Graph Structure15119 Independent Sets and Coloring15220 Graph Partitioning15921 Cheeger s Inequality16422 Local Graph Clustering16923 Spectral Partitioning in a Stochastic Block Model17724 Nodal Domains18425 The Second Eigenvalue of Planar Graphs19226 Planar G
One must convey how the coordinates of eigenvectors correspond to vertices in a graph. This is obvious to those who understand it, but it can take a while for students to grasp. One must introduce necessary linear algebra and show some interesting interpretations of …
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