Ill-Posed Problems and Integral Equations.

Abstract

This document addresses 5 substantial problems in the theory and numerical analysis of ill-posed problems and integral equations: (1) Collocation, and Galerkin methods for Volterra and Abel equations of the first kind; (2) Galerkin and collocation methods for nonlinear Abel-Volterra integral equations on the half-line and on a finite interval; (3) a new approach to classification and regularization of ill-posed operator equations, and quantification of ill-posedness; (4) operator external problems in the theory of compensation and representation of control systems; (5) constrained least-squares solutions of linear inclusions and singular control problems in Hilbert space. New notions of bivariational and singular variational derivatives for functionals are also studies. They will be applied to extend the von Mises calculus for statistical functionals and its applications to robustness and approximation theorems. Keyboards: Multivalued linear mappings; Kernel functions.

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Document Details

Document Type
Technical Report
Publication Date
Feb 22, 1988
Accession Number
ADA193709

Entities

People

  • M. Z. Nashed
  • Paul P. Eggermont

Organizations

  • University of Delaware

Tags

DTIC Thesaurus Topics

  • Applied Mathematics
  • Banach Space
  • Calculus
  • Classification
  • Control Systems
  • Convex Sets
  • Differential Equations
  • Equations
  • Functional Analysis
  • Galerkin Method
  • Hilbert Space
  • Integral Equations
  • Integrals
  • Kernel Functions
  • Numerical Analysis
  • Theorems
  • Topology

Fields of Study

  • Mathematics

Readers

  • Adaptive Control and Estimation with Uncertainty in Dynamic Systems.
  • Calculus or Mathematical Analysis
  • Finite Element Method (FEM) for solving Partial Differential Equations (PDEs)

Technology Areas

  • Space
  • Space - Spacecraft Maneuvers