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Abstract Details
Activity Number:
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105
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Type:
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Invited
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Date/Time:
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Monday, August 1, 2011 : 8:30 AM to 10:20 AM
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Sponsor:
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IMS
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Abstract - #300123 |
Title:
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Calibrated Path Sampling and Stepwise Bridge Sampling
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Author(s):
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Zhiqiang Tan*+
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Companies:
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Rutgers University
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Address:
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, , 08854, USA
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Keywords:
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Normalizing constant; ;
Bridge sampling ;
Path sampling
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Abstract:
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Consider probability distributions with unnormalized density functions indexed by parameters on a 2-dimensional grid, and assume that samples are simulated from distributions on a subgrid. Path sampling uses samples along a 1-dimensional path to compute each integral. However, different choices of the path lead to different estimators, which should ideally be identical. We propose calibrated estimators by the method of control variates to exploit such constraints for variance reduction. We also propose biquadratic interpolation to approximate integrals with parameters outside the subgrid, consistently with the calibrated estimators on the subgrid. These methods can be extended to compute differences of expectations through an auxiliary identity for path sampling. Furthermore, we develop stepwise bridge-sampling methods in parallel but complementary to path sampling. In three simulation studies, the proposed methods lead to substantially reduced mean squared errors compared with existing methods.
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Authors who are presenting talks have a * after their name.
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