Gradient States for Some Dualities with the Charnes-Cooper Extremal Principle.
TEXAS UNIV AT AUSTIN CENTER FOR CYBERNETIC STUDIES
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Gradient characterizations of some convex function infima are derived which apply to extension of the Charnes-Cooper duality state characterizations to more general classes of convex programming problems via the Charnes-Cooper extremal principle for optimization dualities. Author
- Theoretical Mathematics