Conductance and Eigenvalue
Abstract
We show the following. theorem Let M be an finite-state ergodic time-reversible Markov chain with transition matrix P and conductance φ. Let λ ∈ (0,1) be an eigenvalue of P. Then, φ2 + λ2 ≤ 1 theorem This strengthens the well-known~HLW,Dod84, AM85, Alo86, JS89 inequality λ ≤ 1- φ2/2. We obtain our result by a slight variation in the proof method in JS89, HLW; the same method was used earlier in RS06 to obtain the same inequality for random walks on regular undirected graphs.
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