1. ISM 206 Optimization Theory and Applications Spring 2005 Lecture 1: Introduction

2. ISM 206 Lecture 1 Overview Some Optimization problem examples Topics in this class Logistics

3. Names Kevin Ross Assistant Professor, Information Systems and Technology Management Interests in queueing theory, optimization, scheduling, networks E2 room 367 Office hours: Tuesday 2-4

4. Problem 1: Transportation P&T Company makes canned peas Peas are prepared in 3 canneries –Washington, Oregon, Minnesota Shipped to 4 distributing warehouses –California, Utah, South Dakota, New Mexico How much should we ship from each cannery to each warehouse? –Transportation costs are different between each pair of locations –There is a limit on capacity at each plant

6. Problem 2: Engineering Design Problem Consider lighting a large area with a number of lamps: Each lamp has a total power limit Several points in the room have a ‘desired illumination level’ How much power should be applied to each lamp to get the room as close as possible to desired level?

7. Problem 2: Engineering Design Problem Now add two more constraints: 1.No more than half the total power goes to any five lamps 2.No more than 15 lamps are turned on What effect do (1) and (2) have on the original problem?

8. Problem 3: Medical Team Distribution World Health Council is devoted to improving health care in underdeveloped countries: Need to allocate five teams to three different countries Each team added gains more person- years of life saved in the country You cannot assign partial teams or partial people

9. Thousand person-years gained 123 0000 1452050 2704570 3907580 4105110100 5120150130 country No. of teams

10. Problem 4: Inventory Levels A wholesale Bicycle Distributor: –Purchases bikes from manufacturer and supplies to many shops –Demand to each shop is uncertain How many bikes should the distributor order from the manufacturer? Costs: –Ordering cost to manufacturer –Holding cost in factory –Shortage cost due to lack of sales

11. Course Overview First graduate class in optimization Main topics: –Linear Programming –Nonlinear programming –Heuristic Methods –Integer programming –Dynamic programming –Inventory Theory

12. Class Schedule LectureDateTopicReadingAssessment 1Tue, 29 MarchIntroduction and ModelingCh 1&2 2Thu, 31 MarchIntro to Linear Programming and the Simplex Method Ch 3,4,5 Homework 1 assigned 3Tue, 5 AprilDuality and Sensitivity Analysis Ch 6 4Thu, 7 AprilOther Algorithms for Linear Programming Ch 7 5Thu, 7 April 4-6pm Transportation, Assignment and Network Optimization Ch 8 & 9Homework 1 due Homework 2 assigned 6Tue, 12 April Nonlinear OptimizationCh 12 7Thu, 14 April Nonlinear Optimization ctd. 8Thu, 14 April 4-6pm Unconstrained Optimization Homework 2 due Homework 3 assigned -Week 19,21 April No class. Instructor away 9Tue, 26 AprilMidterm Exam

13. Class Schedule LectureDateTopicReadingAssessment 10Thu, 28 AprilDynamic ProgrammingCh 10Homework 3 due. Homework 4 assigned 11Thu, 28 April 4-6pm Integer ProgrammingCh 11 12Tue, 3 MayMetaheuristicsCh 13 13Thu, 5 May Metaheuristics 2 14Thu, 5 May 4-6pm Game TheoryCh 14 15Tue, 10 MayDecision AnalysisCh 15Homework 4 due. Homework 5 assigned 16Thu, 12 MayMarkov ChainsCh 16 -Week of 17, 19 May No class. Instructor away

14. Class Schedule LectureDateTopicReadingAssessment 17Tue, 24 May Queueing TheoryCh 17 18Thu, 26 May Inventory theoryCh 18 19Tue, 31 May SimulationCh 20Homework 5 due 20Thu, 2 June Final Class - Review Tue, 7 June 4:00 – 7:00 pm FINAL Final Exam

15. Assessment Five homework sets, assigned approximately every two weeks. Late assignments will lose 10% per day. Lecture Notes Each lecture one student will act as a scribe for everyone. They are responsible for typing up the lecture notes using Latex. The notes are due 1 week after the assigned lecture. Depending on class size, you will be assigned two or three lectures to write up. Exams Exams will be open book and open notes. You may bring a basic calculator but not a computer. Homework35% Lecture Notes5% Midterm Exam20% Final Exam40%

16. Lecture Notes Schedule Volunteers for today and Thursday –Each lecture one student will act as a scribe for everyone. –They are responsible for typing up the lecture notes using Latex. –The notes are due 1 week after the assigned lecture. Schedule to be announced Thursday

17. Off weeks Instructor away 2 weeks of this quarter Need to agree on time for make-up classes Suggestion: Thursday afternoons. Time?

18. My request… Feedback! This class is for you

19. Optimization Overview Variables: Objective: Subject to Constraints: Sometimes additional constraints: –Binary –Integer Sometimes uncertainty in parameters (stochastic optimization)

20. Types of Optimization Problems Linear: Linear functions for objective and constraints Nonlinear: Nonlinear functions… Convex Integer Mixed-Integer Combinatorial Unconstrained: No constraints Dynamic: Solved in stages

21. Optimization terms and Concepts Variable Feasible region Solution (feasible point) Optimal solution (best point) Global and local optimality Optimality conditions Duality Direct methods Numerical methods Heuristics

22. Modeling and Optimization Stages 1.Define problem and gather data Feasibility check 2.Formulate mathematical model 3.Develop computer-based method for finding optimal solution Design and Software implementation 4.Test and refine model Validation 5.Prepare for ongoing model utilization Training, installation 6.Implement Maintenance, updates, reviews, documentation, dissemination

23. Software with Text Link to softwaresoftware