Extends Lagrangian methods and convergence analysis to mixed-integer nonlinear programs using a local optimality notion for polyhedral constraints.
Hybrid optimal control with mixed- integer Lagrangian methods
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A solver-agnostic condensing reformulation for linear-quadratic optimization with polyhedral and geometric constraints that preserves augmented-Lagrangian convergence while improving computational speed.
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Affordable mixed-integer Lagrangian methods: optimality conditions and convergence analysis
Extends Lagrangian methods and convergence analysis to mixed-integer nonlinear programs using a local optimality notion for polyhedral constraints.
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A condensing approach for linear-quadratic optimization with geometric constraints
A solver-agnostic condensing reformulation for linear-quadratic optimization with polyhedral and geometric constraints that preserves augmented-Lagrangian convergence while improving computational speed.