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A Max-Type Recursive Model : Some Properties and Open Questions. / Chen, Xinxing; Derrida, Bernard; Hu, Yueyun; Lifshits, Mikhail; Shi, Zhan.

Sojourns in Probability Theory and Statistical Physics - III - Interacting Particle Systems and Random Walks, A Festschrift for Charles M. Newman. ред. / Vladas Sidoravicius. Springer Nature, 2019. стр. 166-186 (Springer Proceedings in Mathematics and Statistics; Том 300).

Результаты исследований: Публикации в книгах, отчётах, сборниках, трудах конференцийстатья в сборнике материалов конференцииРецензирование

Harvard

Chen, X, Derrida, B, Hu, Y, Lifshits, M & Shi, Z 2019, A Max-Type Recursive Model: Some Properties and Open Questions. в V Sidoravicius (ред.), Sojourns in Probability Theory and Statistical Physics - III - Interacting Particle Systems and Random Walks, A Festschrift for Charles M. Newman. Springer Proceedings in Mathematics and Statistics, Том. 300, Springer Nature, стр. 166-186, International Conference on Probability Theory and Statistical Physics, 2016, Shanghai, Китай, 25/03/16. https://doi.org/10.1007/978-981-15-0302-3_6

APA

Chen, X., Derrida, B., Hu, Y., Lifshits, M., & Shi, Z. (2019). A Max-Type Recursive Model: Some Properties and Open Questions. в V. Sidoravicius (Ред.), Sojourns in Probability Theory and Statistical Physics - III - Interacting Particle Systems and Random Walks, A Festschrift for Charles M. Newman (стр. 166-186). (Springer Proceedings in Mathematics and Statistics; Том 300). Springer Nature. https://doi.org/10.1007/978-981-15-0302-3_6

Vancouver

Chen X, Derrida B, Hu Y, Lifshits M, Shi Z. A Max-Type Recursive Model: Some Properties and Open Questions. в Sidoravicius V, Редактор, Sojourns in Probability Theory and Statistical Physics - III - Interacting Particle Systems and Random Walks, A Festschrift for Charles M. Newman. Springer Nature. 2019. стр. 166-186. (Springer Proceedings in Mathematics and Statistics). https://doi.org/10.1007/978-981-15-0302-3_6

Author

Chen, Xinxing ; Derrida, Bernard ; Hu, Yueyun ; Lifshits, Mikhail ; Shi, Zhan. / A Max-Type Recursive Model : Some Properties and Open Questions. Sojourns in Probability Theory and Statistical Physics - III - Interacting Particle Systems and Random Walks, A Festschrift for Charles M. Newman. Редактор / Vladas Sidoravicius. Springer Nature, 2019. стр. 166-186 (Springer Proceedings in Mathematics and Statistics).

BibTeX

@inproceedings{0d14804e85ca44019b8a0f0a3146a3e9,
title = "A Max-Type Recursive Model: Some Properties and Open Questions",
abstract = "We consider a simple max-type recursive model which was introduced in the study of depinning transition in presence of strong disorder, by Derrida and Retaux [5]. Our interest is focused on the critical regime, for which we study the extinction probability, the first moment and the moment generating function. Several stronger assertions are stated as conjectures.",
keywords = "Critical regime, Free energy, Max-type recursive model, Survival probability",
author = "Xinxing Chen and Bernard Derrida and Yueyun Hu and Mikhail Lifshits and Zhan Shi",
note = "Funding Information: X. C. was supported by NSFC grants Nos. 11771286 and 11531001. M. L. was supported by RFBR grant 16-01-00258. Part of the work was carried out when M. L. and Z. S. were visiting, respectively, LPMA Universit? Pierre et Marie Curie in June and July 2016, and New York University Shanghai in spring 2016; we are grateful to LPMA and NYUSH for their hospitality. Funding Information: Acknowledgments. X. C. was supported by NSFC grants Nos. 11771286 and 11531001. M. L. was supported by RFBR grant 16-01-00258. Part of the work was carried out when M. L. and Z. S. were visiting, respectively, LPMA Universit{\'e} Pierre et Marie Curie in June and July 2016, and New York University Shanghai in spring 2016; we are grateful to LPMA and NYUSH for their hospitality. Publisher Copyright: {\textcopyright} Springer Nature Singapore Pte Ltd. 2019. Copyright: Copyright 2020 Elsevier B.V., All rights reserved.; International Conference on Probability Theory and Statistical Physics, 2016 ; Conference date: 25-03-2016 Through 27-03-2016",
year = "2019",
doi = "10.1007/978-981-15-0302-3_6",
language = "English",
isbn = "9789811503016",
series = "Springer Proceedings in Mathematics and Statistics",
publisher = "Springer Nature",
pages = "166--186",
editor = "Vladas Sidoravicius",
booktitle = "Sojourns in Probability Theory and Statistical Physics - III - Interacting Particle Systems and Random Walks, A Festschrift for Charles M. Newman",
address = "Germany",

}

RIS

TY - GEN

T1 - A Max-Type Recursive Model

T2 - International Conference on Probability Theory and Statistical Physics, 2016

AU - Chen, Xinxing

AU - Derrida, Bernard

AU - Hu, Yueyun

AU - Lifshits, Mikhail

AU - Shi, Zhan

N1 - Funding Information: X. C. was supported by NSFC grants Nos. 11771286 and 11531001. M. L. was supported by RFBR grant 16-01-00258. Part of the work was carried out when M. L. and Z. S. were visiting, respectively, LPMA Universit? Pierre et Marie Curie in June and July 2016, and New York University Shanghai in spring 2016; we are grateful to LPMA and NYUSH for their hospitality. Funding Information: Acknowledgments. X. C. was supported by NSFC grants Nos. 11771286 and 11531001. M. L. was supported by RFBR grant 16-01-00258. Part of the work was carried out when M. L. and Z. S. were visiting, respectively, LPMA Université Pierre et Marie Curie in June and July 2016, and New York University Shanghai in spring 2016; we are grateful to LPMA and NYUSH for their hospitality. Publisher Copyright: © Springer Nature Singapore Pte Ltd. 2019. Copyright: Copyright 2020 Elsevier B.V., All rights reserved.

PY - 2019

Y1 - 2019

N2 - We consider a simple max-type recursive model which was introduced in the study of depinning transition in presence of strong disorder, by Derrida and Retaux [5]. Our interest is focused on the critical regime, for which we study the extinction probability, the first moment and the moment generating function. Several stronger assertions are stated as conjectures.

AB - We consider a simple max-type recursive model which was introduced in the study of depinning transition in presence of strong disorder, by Derrida and Retaux [5]. Our interest is focused on the critical regime, for which we study the extinction probability, the first moment and the moment generating function. Several stronger assertions are stated as conjectures.

KW - Critical regime

KW - Free energy

KW - Max-type recursive model

KW - Survival probability

UR - http://www.scopus.com/inward/record.url?scp=85085732115&partnerID=8YFLogxK

U2 - 10.1007/978-981-15-0302-3_6

DO - 10.1007/978-981-15-0302-3_6

M3 - Conference contribution

AN - SCOPUS:85085732115

SN - 9789811503016

T3 - Springer Proceedings in Mathematics and Statistics

SP - 166

EP - 186

BT - Sojourns in Probability Theory and Statistical Physics - III - Interacting Particle Systems and Random Walks, A Festschrift for Charles M. Newman

A2 - Sidoravicius, Vladas

PB - Springer Nature

Y2 - 25 March 2016 through 27 March 2016

ER -

ID: 75053190