Causality Structure and the Weierstrass Theorem.

Abstract

In a recent paper P. M. Prenter has shown that the Weierstrass theorem can be lifted up to a real separable Hilbert space, H. In this paper H is equipped with an identity resolving orthoprojector chain. The Weierstrass type result of Prenter namely; if f is any continuous function on H, then there exists a finite order approximating polynomic operator on every compact K belongs to H, is sharpened by the extension; if f is strictly causal (strictly anticausal) then the polynomic approximation can also be strictly causal (strictly anticausal). Other extensions in the same spirit are developed and the results are interpreted in the setting of Volterra operators on (L sub 2). (Author)

Document Details

Document Type
Technical Report
Publication Date
Feb 01, 1974
Accession Number
AD0779733

Entities

People

  • Romano M. Desantis
  • Thomas M. Clark
  • William A. Porter

Organizations

  • University of Michigan

Tags

DTIC Thesaurus Topics

  • Banach Space
  • Behavior And Behavior Mechanisms
  • Behavioral Disciplines And Activities
  • Behavioral Sciences
  • Cooperation
  • Functional Analysis
  • Group Dynamics
  • Hilbert Space
  • Identities
  • Mathematics

Readers

  • Calculus or Mathematical Analysis
  • Graph Algorithms and Convex Optimization.

Technology Areas

  • Space