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New methods for solving nonconvex and singular generalized Nash equilibrium problems via polynomial optimization
TANG, Xindong
(PI)
Qu, Zheng
(CoI)
Department of Mathematics
Project
:
Research project
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Explore the research topics touched on by this project. These labels are generated based on the underlying awards/grants. Together they form a unique fingerprint.
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Keyphrases
Generalized Nash Equilibrium Problem
100%
Polynomial Optimization
100%
Nonconvex
100%
Generalized Nash Equilibrium
50%
Polynomial Optimization Problem
50%
Polynomial Function
25%
Numerical Methods
25%
Moment-SOS Hierarchy
25%
Semidefinite Relaxation
25%
Karush-Kuhn-Tucker Conditions
25%
Karush-Kuhn-Tucker Points
25%
Game Strategy
25%
Sparsity
25%
Mathematics
Polynomial Optimization
100%
Nash Equilibrium
100%
Equilibrium Problem
100%
Polynomial
33%
Karush-Kuhn-Tucker Condition
16%
Mathematical Method
16%
Objective Function
16%
Polynomial Function
16%