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Constrained Equilibrium Point of Maximal Monotone Operator Via Variational Inequality

  • M. Przeworski and D. Zagrodny
Published/Copyright: June 4, 2010
Journal of Applied Analysis
From the journal Journal of Applied Analysis Volume 5 Issue 1

Abstract

Herein a sufficient condition for q to belong to QT–1(0) is provided, where Q is a weakly compact convex subset of a real reflexive Banach space E and is a maximal monotone operator.

Key words and phrases.: Maximal monotonicity; equilibrium point
Received: 1998-12-04
Published Online: 2010-06-04
Published in Print: 1999-June

© Heldermann Verlag

Articles in the same Issue

  1. Oscillation Criteria for a Class of Functional Parabolic Equations
  2. Singular Filters for the Radon Backprojection
  3. Chemical Attack in Free Boundary Domains
  4. On Minimax Inequality and Generalized Quasi–Variational Inequality in H-Spaces
  5. Covering Baire 1 Functions with Darboux Functions and the Cofinality of the Ideal of Meager Sets
  6. On a Type of Hyperbolic Variational–Hemivariational Inequalities
  7. A Coloring Result for the Plane
  8. Nonlinear Alternative: Application to an Integral Equation
  9. Multivariable Regular Variation of Functions and Measures
  10. Constrained Equilibrium Point of Maximal Monotone Operator Via Variational Inequality
https://doi.org/10.1515/JAA.1999.147
Keywords for this article
Maximal monotonicity; equilibrium point

Articles in the same Issue

  1. Oscillation Criteria for a Class of Functional Parabolic Equations
  2. Singular Filters for the Radon Backprojection
  3. Chemical Attack in Free Boundary Domains
  4. On Minimax Inequality and Generalized Quasi–Variational Inequality in H-Spaces
  5. Covering Baire 1 Functions with Darboux Functions and the Cofinality of the Ideal of Meager Sets
  6. On a Type of Hyperbolic Variational–Hemivariational Inequalities
  7. A Coloring Result for the Plane
  8. Nonlinear Alternative: Application to an Integral Equation
  9. Multivariable Regular Variation of Functions and Measures
  10. Constrained Equilibrium Point of Maximal Monotone Operator Via Variational Inequality
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