Stochastic Enumeration with Importance Sampling
February 02, 2019 Β· Declared Dead Β· π Methodology and Computing in Applied Probability
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Authors
Alathea Jensen
arXiv ID
1902.01698
Category
cs.DS: Data Structures & Algorithms
Cross-listed
math.PR
Citations
1
Venue
Methodology and Computing in Applied Probability
Last Checked
4 months ago
Abstract
Many hard problems in the computational sciences are equivalent to counting the leaves of a decision tree, or, more generally, summing a cost function over the nodes. These problems include calculating the permanent of a matrix, finding the volume of a convex polyhedron, and counting the number of linear extensions of a partially ordered set. Many approximation algorithms exist to estimate such sums. One of the most recent is Stochastic Enumeration (SE), introduced in 2013 by Rubinstein. In 2015, Vaisman and Kroese provided a rigorous analysis of the variance of SE, and showed that SE can be extended to a fully polynomial randomized approximation scheme for certain cost functions on random trees. We present an algorithm that incorporates an importance function into SE, and provide theoretical analysis of its efficacy. We also present the results of numerical experiments to measure the variance of an application of the algorithm to the problem of counting linear extensions of a poset, and show that introducing importance sampling results in a significant reduction of variance as compared to the original version of SE.
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