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A Mathematical Theory of Optimal Milestoning (with a Detour via Exact Milestoning)

Publication ,  Journal Article
Lin, L; Lu, J; Vanden-Eijnden, E
Published in: Communications on Pure and Applied Mathematics
June 1, 2018

Milestoning is a computational procedure that reduces the dynamics of complex systems to memoryless jumps between intermediates, or milestones, and only retains some information about the probability of these jumps and the time lags between them. Here we analyze a variant of this procedure, termed optimal milestoning, which relies on a specific choice of milestones to capture exactly some kinetic features of the original dynamical system. In particular, we prove that optimal milestoning permits the exact calculation of the mean first passage times (MFPT) between any two milestones. In so doing, we also analyze another variant of the method, called exact milestoning, which also permits the exact calculation of certain MFPTs, but at the price of retaining more information about the original system's dynamics. Finally, we discuss importance sampling strategies based on optimal and exact milestoning that can be used to bypass the simulation of the original system when estimating the statistical quantities used in these methods.© 2017 Wiley Periodicals, Inc.

Duke Scholars

Published In

Communications on Pure and Applied Mathematics

DOI

EISSN

1097-0312

ISSN

0010-3640

Publication Date

June 1, 2018

Volume

71

Issue

6

Start / End Page

1149 / 1177

Related Subject Headings

  • General Mathematics
  • 4904 Pure mathematics
  • 4901 Applied mathematics
  • 0102 Applied Mathematics
  • 0101 Pure Mathematics
 

Citation

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Lin, L., Lu, J., & Vanden-Eijnden, E. (2018). A Mathematical Theory of Optimal Milestoning (with a Detour via Exact Milestoning). Communications on Pure and Applied Mathematics, 71(6), 1149–1177. https://doi.org/10.1002/cpa.21725
Lin, L., J. Lu, and E. Vanden-Eijnden. “A Mathematical Theory of Optimal Milestoning (with a Detour via Exact Milestoning).” Communications on Pure and Applied Mathematics 71, no. 6 (June 1, 2018): 1149–77. https://doi.org/10.1002/cpa.21725.
Lin L, Lu J, Vanden-Eijnden E. A Mathematical Theory of Optimal Milestoning (with a Detour via Exact Milestoning). Communications on Pure and Applied Mathematics. 2018 Jun 1;71(6):1149–77.
Lin, L., et al. “A Mathematical Theory of Optimal Milestoning (with a Detour via Exact Milestoning).” Communications on Pure and Applied Mathematics, vol. 71, no. 6, June 2018, pp. 1149–77. Scopus, doi:10.1002/cpa.21725.
Lin L, Lu J, Vanden-Eijnden E. A Mathematical Theory of Optimal Milestoning (with a Detour via Exact Milestoning). Communications on Pure and Applied Mathematics. 2018 Jun 1;71(6):1149–1177.
Journal cover image

Published In

Communications on Pure and Applied Mathematics

DOI

EISSN

1097-0312

ISSN

0010-3640

Publication Date

June 1, 2018

Volume

71

Issue

6

Start / End Page

1149 / 1177

Related Subject Headings

  • General Mathematics
  • 4904 Pure mathematics
  • 4901 Applied mathematics
  • 0102 Applied Mathematics
  • 0101 Pure Mathematics