2000
DOI: 10.1307/mmj/1030132713
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Analysis of systematic scan Metropolis algorithms using Iwahori-Hecke algebra techniques.

Abstract: We give the first analysis of a systematic scan version of the Metropolis algorithm. Our examples include generating random elements of a Coxeter group with probability determined by the length function. The analysis is based on interpreting Metropolis walks in terms of the multiplication in the Iwahori-Hecke algebra.persi diaconis and arun ram is the normalizing constant. Thus π(w) is smallest when w = id and, as θ → 1, π tends to the uniform distribution. These non-uniform distributions arise in statistical … Show more

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Cited by 78 publications
(136 citation statements)
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“…This verifies a conjecture of Diaconis and Ram [7]. A lower bound for the mixing time of the form N 2 is easy and well known.…”
Section: Introductionsupporting
confidence: 86%
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“…This verifies a conjecture of Diaconis and Ram [7]. A lower bound for the mixing time of the form N 2 is easy and well known.…”
Section: Introductionsupporting
confidence: 86%
“…However, the probability space contains elements of very small probability, so the term log(1/ min x π(x)) is of order N 2 (see [7], where the stationary distribution for the Metropolis chain is given). Thus (5) yields a bound of order N 2 .…”
Section: P(h(imentioning
confidence: 99%
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“…The literature on Mallows and Generalized Mallows models ranges from theoretical discussion [15], [17], [19], [24], [42], [43] to more practical applications to multilabel classification [9], label ranking [8] or estimation of distribution algorithms [7].…”
Section: Introductionmentioning
confidence: 99%
“…Note. A probabilistic interpretation of certain Hecke algebra products different from ours appears in a paper by Diaconis and Ram [4].…”
Section: A Connection With Random Walks On S Nmentioning
confidence: 84%