Quasistable Parametric Optimization Without Compact Level Sets.

Abstract

The well-known perturbational duality theory for convex optimization is refined to handle directly, in locally convex Hausdorff spaces, problems involving noncoercive convex functionals together with unbounded densely defined linear operators or, more generally, convex processes. The theory presented includes conjugacy, recession, and epsilon-subdifferential formulas for the two fundamental pairs of dual operations and also includes systematic treatment of epsilon-solutions. (Author)

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Document Details

Document Type
Technical Report
Publication Date
Jun 01, 1984
Accession Number
ADA144716

Entities

People

  • L. Mclinden

Organizations

  • University of Wisconsin–Madison

Tags

Communities of Interest

  • Materials and Manufacturing Processes

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  • Linear Programming
  • Mathematical Models
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  • North Carolina
  • Numerical Analysis
  • Operations Research
  • Optimization
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  • Variational Principles
  • Vector Spaces

Fields of Study

  • Mathematics

Readers

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

Technology Areas

  • Space