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Optimal tail estimates for directed last passage site percolation with geometric random variables

Publication ,  Journal Article
Baik, J; Deift, P; McLaughlin, K; Miller, P; Zhou, X
Published in: Advances in Theoretical and Mathematical Physics
January 1, 2001
Published version (DOI)

In this paper, we obtain optimal uniform lower tail estimates for the probability distribution of the properly scaled length of the longest up/right path of the last passage site percolation model considered by Johansson in [12]. The estimates are used to prove a lower tail moderate deviation result for the model. The estimates also imply the convergence of moments, and also provide a verification of the universal scaling law relating the longitudinal and the transversal fluctuations of the model.

Duke Scholars

Xin Zhou
Author Xin Zhou Mathematics

Published In

Advances in Theoretical and Mathematical Physics

DOI

10.4310/atmp.2001.v5.n6.a7

EISSN

1095-0753

ISSN

1095-0761

Publication Date

January 1, 2001

Volume

5

Issue

6

Start / End Page

1207 / 1250

Related Subject Headings

  • Nuclear & Particles Physics
  • 5107 Particle and high energy physics
  • 4902 Mathematical physics
  • 0206 Quantum Physics
  • 0105 Mathematical Physics
 

Citation

APA
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ICMJE
MLA
NLM
Baik, J., Deift, P., McLaughlin, K., Miller, P., & Zhou, X. (2001). Optimal tail estimates for directed last passage site percolation with geometric random variables. Advances in Theoretical and Mathematical Physics, 5(6), 1207–1250. https://doi.org/10.4310/atmp.2001.v5.n6.a7
Baik, J., P. Deift, K. McLaughlin, P. Miller, and X. Zhou. “Optimal tail estimates for directed last passage site percolation with geometric random variables.” Advances in Theoretical and Mathematical Physics 5, no. 6 (January 1, 2001): 1207–50. https://doi.org/10.4310/atmp.2001.v5.n6.a7.
Baik J, Deift P, McLaughlin K, Miller P, Zhou X. Optimal tail estimates for directed last passage site percolation with geometric random variables. Advances in Theoretical and Mathematical Physics. 2001 Jan 1;5(6):1207–50.
Baik, J., et al. “Optimal tail estimates for directed last passage site percolation with geometric random variables.” Advances in Theoretical and Mathematical Physics, vol. 5, no. 6, Jan. 2001, pp. 1207–50. Scopus, doi:10.4310/atmp.2001.v5.n6.a7.
Baik J, Deift P, McLaughlin K, Miller P, Zhou X. Optimal tail estimates for directed last passage site percolation with geometric random variables. Advances in Theoretical and Mathematical Physics. 2001 Jan 1;5(6):1207–1250.

Published In

Advances in Theoretical and Mathematical Physics

DOI

10.4310/atmp.2001.v5.n6.a7

EISSN

1095-0753

ISSN

1095-0761

Publication Date

January 1, 2001

Volume

5

Issue

6

Start / End Page

1207 / 1250

Related Subject Headings

  • Nuclear & Particles Physics
  • 5107 Particle and high energy physics
  • 4902 Mathematical physics
  • 0206 Quantum Physics
  • 0105 Mathematical Physics