On A Neutral Functional Differential Equation in a Fading Memory Space.

Abstract

The linear autonomous, neutral system of functional differential equations are studied in a fading memory space. Conditions are given which imply that solutions of the functional differential equation can be decomposed into a stable part and an unstable part. These conditions are of frequency domain type. The results can be used to decompose the semigroup generated by the functional differential equation into a stable part and an unstable part.

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Document Details

Document Type
Technical Report
Publication Date
Sep 01, 1981
Accession Number
ADA110484

Entities

People

  • Olof Staffans

Organizations

  • University of Wisconsin–Madison

Tags

DTIC Thesaurus Topics

  • Abstracts
  • Analytic Functions
  • Banach Space
  • Classification
  • Contracts
  • Differential Equations
  • Equations
  • Functional Analysis
  • Harmonic Analysis
  • Integral Equations
  • Integrals
  • Mathematics
  • Numbers
  • Partial Differential Equations
  • Polynomials
  • United States
  • Volterra Equations

Fields of Study

  • Mathematics

Readers

  • Adaptive Control and Estimation with Uncertainty in Dynamic Systems.
  • Organic Chemistry

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  • Space