(i) Improving modeling skills.
(ii) Comprehension of the main concepts and techniques from LP and IP.
(iii) Improving mathematical maturity.
Jorge Orestes Lasbarrères Cerdeira
Weekly - 5
Total - Available soon
Students should have knowledge in Linear Algebra, Calculus, and have some skills on algorithms.
Operations Research: Applications and Algorithms, Wayne L. Winston, Brooks/Cole; 4th edition edition, 2004.
Introduction to Mathematical Optimization, Matteo Fischetti, Kindle Direct Publishing, 2019.
A First Course in Linear Optimization, Jon Lee, Reex Press, third edition, 2013-2018 https://github.com/jon77lee/JLee_LinearOptimizationBook/blob/master/JLee.3.12.pdf
Classes are theoretical/practical with oral presentation of concepts, methodologies, and examples, complemented with problem solving. Specific student difficulties will be addressed during classes or in individual sessions scheduled with the teacher.
Continuous evaluation is based on two tests. If a student does not obtain approval through continuous evaluation he can try it in an additional examination.
Rules of evaluation
The student may be evaluated by two tests, each scored 10, and will be approved if the two tests sum up (rounded) at least 10. The grade will be the rounded sum of the tests.
The student may also be approved by a final exam if the exam''''s grade is at least 10. The grade will be the one attained in the exam (rounded) and any grade in any test will be discarded.
Linear programming (LP): problem formulation, LP geometry, the simplex algorithm, duality, sensitivity analysis.
Integer linear programming (IP): problem formulation, LP vs IP, relaxations, the branch and bound method, heuristics, computational complexity.
Programs where the course is taught: