Chaos and thermal conductivity Metadata

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Title

  • Main Title Chaos and thermal conductivity

Creator

  • Author: Corezzi, Silvia
    Creator Type: Personal
    Creator Info: Università di Pisa
  • Author: Bianucci, Marco
    Creator Type: Personal
    Creator Info: Università di Pisa
  • Author: Grigolini, Paolo
    Creator Type: Personal
    Creator Info: University of North Texas; Università di Pisa; Istituto di Biofisica del CNR

Publisher

  • Name: American Physical Society
    Place of Publication: [College Park, Maryland]

Date

  • Creation: 1995-12

Language

  • English

Description

  • Content Description: Article discussing research on chaos and thermal conductivity.
  • Physical Description: 4 p.

Subject

  • Keyword: local thermal equilibrium
  • Keyword: microscopic derivation
  • Keyword: heat Fourier law

Source

  • Journal: Physical Review E, 1995, College Park: American Physical Society, pp. 6881-6884

Citation

  • Publication Title: Physical Review E
  • Volume: 52
  • Issue: 6
  • Page Start: 6881
  • Page End: 6884
  • Peer Reviewed: True

Collection

  • Name: UNT Scholarly Works
    Code: UNTSW

Institution

  • Name: UNT College of Arts and Sciences
    Code: UNTCAS

Rights

  • Rights Access: public

Resource Type

  • Article

Format

  • Text

Identifier

  • DOI: 10.1103/PhysRevE.52.6881
  • Archival Resource Key: ark:/67531/metadc139502

Degree

  • Academic Department: Physics
  • Academic Department: Center for Nonlinear Science

Note

  • Display Note: Copyright 1995 American Physical Society. The following article appeared in Physical Review E, 1995, 52:6, pp. 6881-6884, http://link.aps.org/doi/10.1103/PhysRevE.52.6881
  • Display Note: Abstract: We argue that the condition of local thermal equilibrium realized several years ago by Rich and Visscher [Phys. Rev. B 11, 2164 (1975)] through a process of mathematical convergence can be obtained dynamically by adopting the prescription of a recent paper [M. Bianucci, R. Mannella, B.J. West, and P. Grigolini, Phys. Rev. E 51, 3002 (1995)]. This should contribute to shedding light on the still unsolved problem fo the microscopic derivation of the heat Fourier law.