The Paley-Wiener Criterion for Relaxation Functions.

Abstract

It is shown that a rigorous mathematical theorem in the theory of Fourier transforms due to Paley and Wiener provides the bound for physically acceptable relaxation functions for long times. The exponential decay function, exp(-t/tau), with a constant relaxation time tau, and hence also a superposition of exponential decay functions corresponding to a distribution of relaxation times, does not provide an acceptable description of relaxation phenomena. On the other hand, the assumable bound of the Paley-Wiener theorem does. This bound turns out to have exactly the same form as a class of relaxation functions that have been successfully applied in the description of many relaxation phenomena in condensed matter. An important consequence of the Paley-Wiener theorem is the necessity for time-dependent relaxation rates which provides insight into the reason for deviation from exponential behavior for long times. (Author)

Open PDF

Document Details

Document Type
Technical Report
Publication Date
Mar 02, 1982
Accession Number
ADA111450

Entities

People

  • A. K. Rajagopal
  • K. L. Ngai
  • R. W. Rendell
  • S. Teitler

Organizations

  • United States Naval Research Laboratory

Tags

Communities of Interest

  • Advanced Electronics

DTIC Thesaurus Topics

  • Amorphous Materials
  • Classification
  • Condensed Matter Physics
  • Continuous Spectra
  • Excitation
  • Military Research
  • Particle Physics
  • Physical Theories
  • Physics
  • Physics Laboratories
  • Quantum Electrodynamics
  • Quantum Mechanics
  • Relaxation Time
  • Security
  • Solid State Physics
  • Subatomic Particles
  • X Rays

Fields of Study

  • Mathematics

Readers

  • Approximation Theory.
  • Calculus or Mathematical Analysis
  • Quantum spin resonance or Electron Paramagnetic Resonance spectroscopy.