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- Dynamic Spectrum Management: Complexity and Duality Zhi-Quan (Tom) Luo, Fellow, IEEE, and Shuzhong Zhang
- Chapter 4 Duality
- Strong Duality Lecturer: Laurent El Ghaoui
- Exact Duality in Semidefinite Programming Based on Elementary
- Entropy Regularized Lpboost
- An Introduction to Duality in Convex Optimization
- TECHNICAL NOTE Fenchel's Duality Theorem for Nearly Convex
- Duality for Mixed Integer Linear Programming
- A Tutorial on Convex Optimization II: Duality and Interior Point Methods
- Convex Analysis, Duality and Optimization
- ‣ LP Duality ‣ Strong Duality Theorem ‣ Bonus Proof of LP Duality
- Lecture 16: October 18 16.1 Review on Duality
- Lecture 7: Weak Duality 7.1 Lagrange Dual Problem
- Duality Theory of Constrained Optimization
- Duality in Nonlinear Programming: a Simplified Applications-Oriented Development* A
- Ekeland's Variational Principle for Interval-Valued Functions
- Lecture 6 Duality
- Cost Functions and Duality for Stochastic Technologies
- Linear Programming Boosting by Column and Row Generation
- Linear Programming 1 an Introduction to Linear Programming
- CS675: Convex and Combinatorial Optimization Fall 2019 Duality of Convex Optimization Problems
- Duality and Stability in Extremum Problems Involving Convex Functions
- Lagrangian Duality
- Lecture 8 : Lagrangian Duality Theory
- 11. Dualization
- Mixed Type Nondifferentiable Higher-Order Symmetric Duality Over Cones
- Duality and Convex Programming
- Duality in Linear Programming
- Duality in Linear Programming 4
- Duality Marco Cuturi
- On the Variational Principle
- Convex Optimization and Lagrange Duality
- Variational Methods in Convex Analysis 1
- 4. Algebra and Duality • Example: Non-Convex Polynomial Optimization • Weak Duality and Duality Gap • the Dual Is Not Intr
- Conjugate Convex Functions • Relation of Primal and Dual Functions • Fenchel Duality Theorems
- Linear Programming, Lagrange Multipliers, and Duality
- A Geometrical Insight on Pseudoconvexity and Pseudomonotonicity Jean-Pierre Crouzeix, Andrew Eberhard, Daniel Ralph
- Duality with Generalized Convexity
- 2. Convexity and Duality • Convex Sets and Functions • Convex
- A General Duality Principle for the Sum of Two Operators1
- Linear Programming Boosting Via Column Generation
- Complete Duality for Quasiconvex and Convex Set-Valued Functions
- Arxiv:1708.03127V2 [Math.FA] 14 Oct 2020 Σ Slwrsm-Otnoswrt H Relative the W.R.T
- Necessary and Sufficient Conditions for Stable Conjugate Duality
- Lagrangian Duality in 10 Minutes
- On Upper Semicontinuity of Duality Mappings
- Lagrange Duality
- Computational Complexity, NP Completeness and Optimization Duality: a Survey
- Duality for Non-Convex Variational Principles
- DUALITY THEOREMS for CONVEX FUNCTIONS Let F Be a Finite
- Duality Gap, Computational Complexity and NP Completeness
- Linear Programming: Chapter 5 Duality