FASTEST MIXING MARKOV CHAIN ON GRAPHS WITH SYMMETRIES
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We show how to exploit symmetries of a graph to efficiently compute the fastest mixing Markov chain on the graph (i.e., find the transition probabilities on the edges to minimize the second-largest eigenvalue modulus of the transition probability matrix). Exploiting symmetry can lead to significant reduction in both the number of variables and the size of matrices in the corresponding semidefinite program, and thus enable numerical solution of large-scale instances that are otherwise computationally infeasible. We obtain analytic or semianalytic results for particular classes of graphs, such as edge-transitive and distance-transitive graphs. We describe two general approaches for symmetry exploitation, based on orbit theory and block-diagonalization, respectively, and establish a formal connection between them.
Date issued
2009-06Department
Massachusetts Institute of Technology. Department of Electrical Engineering and Computer ScienceJournal
SIAM Journal on Scientific Computing
Publisher
Society for Industrial and Applied Mathematics
Citation
Boyd, Stephen et al. “Fastest Mixing Markov Chain on Graphs with Symmetries.” SIAM Journal on Optimization 20.2 (2009): 792-819. © 2009 Society for Industrial and Applied Mathematics
Version: Final published version
ISSN
1095-7197