Results 161 to 170 of about 136,528 (194)
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1985
In deriving our results concerning infinite vector series [3], R. G. Jeroslow and I discovered a new framework for certain infinitely constrained problems which results in a symmetric primal-dual pair of programs. This pairing subsumes the standard primal-dual pair of linear programming, semi-infinite programming and even finite convex programming.
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In deriving our results concerning infinite vector series [3], R. G. Jeroslow and I discovered a new framework for certain infinitely constrained problems which results in a symmetric primal-dual pair of programs. This pairing subsumes the standard primal-dual pair of linear programming, semi-infinite programming and even finite convex programming.
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On Mixed Symmetric Duality in Multiobjective Programming
OPSEARCH, 1999A new symmetric dual formulation, called the mixed symmetric dual, is presented for a class of nonlilnear multiobjective programming problems and various duality theorems are established. This mixed dual formulation unifies the two existing symmetric dual formulations in the literature.
Bector, C. R., Chandra, Suresh, Abha
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Atomistic Symmetric Lattices with Duality
1970A lattice L with 0 and 1 is called a DAC-lattice when both L and its dual L* are AC-lattices, that is, atomistic lattices with the covering property. If L is a DAC-lattice then so is L* evidently.
Fumitomo Maeda, Shûichirô Maeda
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Multiobjective symmetric duality with cone constraints
European Journal of Operational Research, 1998zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Kim, Do Sang +2 more
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Actions for Duality-Symmetric Fields
2000The problem of constructing models described by duality-invariant actions has a rather long history. It goes back to time when Poincare and later on Dirac noticed electric-magnetic duality symmetry of the free Maxwell equations, and, Dirac (1931) assumed the existence of magnetically charged particles (monopoles and dyons) admitting the duality ...
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DRIFT TRANSFORMATIONS OF SYMMETRIC DIFFUSIONS, AND DUALITY
Infinite Dimensional Analysis, Quantum Probability and Related Topics, 2007Starting with a symmetric Markov diffusion process X (with symmetry measure m and L2 (m) infinitesimal generator A) and a suitable core [Formula: see text] for the Dirichlet form of X, we describe a class of derivations defined on [Formula: see text].
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Trace and Duality in Symmetric Monoidal Categories
K-Theory, 2005For a symmetric monoidal category \(\mathcal C\) with a realization functor for simplicial objects in it, we can take any monoid \(R\) in \(\mathcal C\) and any \(R\)-bimodule \(E\), and construct and then realize the Hochschild complex of \(R\) in \(E\).
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Symmetric Duality for Generalized Unconstrained Geometric Programming
SIAM Journal on Applied Mathematics, 1970The conjugate transform is used to generalize, symmetrize, and further study Duffin’s original formulation of duality for unconstrained geometric programming. This study provides new economic interpretations for the geometric dual problem; and it yields new theorems concerning the existence,uniqueness and characterization of optimal solutions.
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Symmetric Duality for Homogeneous Multiple-Objective Problems
Journal of Optimization Theory and Applications, 2011Motivated by economic applications, the author proposes a symmetric duality approach for a multiobjective optimization problems by means of his earlier quasi-conjugacy notion. Strong duality statements and characterizations of the (weakly) efficient solutions of the considered primal and dual problems are provided, too.
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Thermoelectric materials with crystal-amorphicity duality induced by large atomic size mismatch
Joule, 2021Kunpeng Zhao +2 more
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