Chaos and entropic chaos in Kac's model without high moments

Kleber Carrapatoso; Amit Einav

doi:10.1214/EJP.v18-2683

Chaos and entropic chaos in Kac's model without high moments

Kleber Carrapatoso
, Amit Einav

Research output: Contribution to journal › Article › peer-review

Abstract

In this paper we present a new local Lévy Central Limit Theorem, showing convergence to stable states that are not necessarily the Gaussian, and use it to find new and intuitive entropically chaotic families with underlying one-particle function that has moments of order 2α, with 1 < α < 2. We also discuss a lower semi continuity result for the relative entropy with respect to our specific family of functions, and use it to show a form of stability property for entropic chaos in our settings.

Original language	English
Journal	Electronic Journal of Probability
Volume	18
DOIs	https://doi.org/10.1214/EJP.v18-2683
Publication status	Published - 9 Sept 2013
Externally published	Yes

Keywords

Entropic chaos
Entropic stability
Entropy
Kac's model
Local lévy central limit theorem

Access to Document

10.1214/EJP.v18-2683

Cite this

@article{9abed5a700ab4da988568712e90e20dc,

title = "Chaos and entropic chaos in Kac's model without high moments",

abstract = "In this paper we present a new local L{\'e}vy Central Limit Theorem, showing convergence to stable states that are not necessarily the Gaussian, and use it to find new and intuitive entropically chaotic families with underlying one-particle function that has moments of order 2α, with 1 < α < 2. We also discuss a lower semi continuity result for the relative entropy with respect to our specific family of functions, and use it to show a form of stability property for entropic chaos in our settings.",

keywords = "Entropic chaos, Entropic stability, Entropy, Kac's model, Local l{\'e}vy central limit theorem",

author = "Kleber Carrapatoso and Amit Einav",

year = "2013",

month = sep,

day = "9",

doi = "10.1214/EJP.v18-2683",

language = "English",

volume = "18",

journal = "Electronic Journal of Probability",

issn = "1083-6489",

}

TY - JOUR

T1 - Chaos and entropic chaos in Kac's model without high moments

AU - Carrapatoso, Kleber

AU - Einav, Amit

PY - 2013/9/9

Y1 - 2013/9/9

N2 - In this paper we present a new local Lévy Central Limit Theorem, showing convergence to stable states that are not necessarily the Gaussian, and use it to find new and intuitive entropically chaotic families with underlying one-particle function that has moments of order 2α, with 1 < α < 2. We also discuss a lower semi continuity result for the relative entropy with respect to our specific family of functions, and use it to show a form of stability property for entropic chaos in our settings.

AB - In this paper we present a new local Lévy Central Limit Theorem, showing convergence to stable states that are not necessarily the Gaussian, and use it to find new and intuitive entropically chaotic families with underlying one-particle function that has moments of order 2α, with 1 < α < 2. We also discuss a lower semi continuity result for the relative entropy with respect to our specific family of functions, and use it to show a form of stability property for entropic chaos in our settings.

KW - Entropic chaos

KW - Entropic stability

KW - Entropy

KW - Kac's model

KW - Local lévy central limit theorem

U2 - 10.1214/EJP.v18-2683

DO - 10.1214/EJP.v18-2683

M3 - Article

AN - SCOPUS:84883332247

SN - 1083-6489

VL - 18

JO - Electronic Journal of Probability

JF - Electronic Journal of Probability

ER -

Chaos and entropic chaos in Kac's model without high moments

Abstract

Keywords

Access to Document

Fingerprint

Cite this