Derivatives, Differences, Multiple Fourier Kernels

Abstract

Identities and inequalities for Fourier kernels and for difference operators are related to a geometric series identity. The resulting machinery is applied to obtain, in the approximation theory for ordinary or partial derivatives of any order, necessary and sufficient conditions in place of classical sufficient conditions. Alternative formulations are given in terms of Tauberian Theorems, and in terms of Schwartz distributions. The results are achieved by making use, as in L. C. Young's papers on Stochastic integrals and the like, of pairs of estimate functions in place of the classical higher moduli of continuity.

Open PDF

Document Details

Document Type
Technical Report
Publication Date
Jan 01, 1976
Accession Number
ADA022744

Entities

People

  • D. B. Liu
  • L. C. Young

Organizations

  • University of Wisconsin–Madison

Tags

Communities of Interest

  • Air Platforms
  • Energy and Power Technologies
  • Materials and Manufacturing Processes

DTIC Thesaurus Topics

  • Analogs
  • Banach Space
  • Continuity
  • Contracts
  • Fourier Analysis
  • Fourier Series
  • Identities
  • Inequalities
  • Integrals
  • Mathematics
  • North Carolina
  • Real Variables
  • Sequences
  • Sequences (Mathematics)
  • Stochastic Processes
  • United States
  • Wisconsin

Fields of Study

  • Mathematics

Readers

  • Approximation Theory.
  • Mathematical Modeling and Probability Theory.