Academics / Courses / DescriptionsIEMS 450-1: Mathematical Optimization I
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Prerequisites
Linear algebra and calculusDescription
Linear programming formulation, simplex algorithm, optimality conditions, duality, practical computation, extensions, applications, and case studies.
Learning Objectives
Students will learn the foundations of linear programming, properties of optimal solutions and various solution methods for optimizing problems involving a linear objective function and linear constraints. Students will be exposed to geometric, algebraic and computational aspects of linear optimization and its extensions.
Topics
- Geometry of Linear Programming (LP)
- Polyhedra, extreme points, degeneracy
- Simplex method
- Duality
- Complexity of LP, ellipsoid method
- Large-scale optimization
- Network flows
- Integer linear programming
Materials
Introduction to Linear Optimization, by D. Bertsimas and J. N. Tsitsiklis, Athena Scientific, 1997
Prerequisites
Linear algebra and calculus