1. Water Resources Development and Management Optimization (Linear Programming) CVEN 5393 Mar 4, 2011

2. Acknowledgements Dr. Yicheng Wang (Visiting Researcher, CADSWES during Fall 2009 – early Spring 2010) for slides from his Optimization course during Fall 2009 Introduction to Operations Research by Hillier and Lieberman, McGraw Hill

3. Today’s Lecture Simplex Method – Recap of algebraic form – Simplex Method in Tabular form Simplex Method for other forms – Equality Constraints – Minimization Problems (Big M and Twophase methods) Sensitivity / Shadow Prices Simplex Method in Matrix form – Basics of Matrix Algebra – Revised Simplex Dual Simplex R-resources / demonstration

4. SIMPLEX METHOD (MATRIX FORM) MATRIX ALGEBRA BASICS REVISED SIMPLEX

5. Matrices and Matrix Operations A matrix is a rectangular array of numbers. For example is a 3 x 2 matrix (matrices are denoted by Boldface Capital Letters) In more general terms,

6. Matrix Operations To multiply a matrix by a number (denote this number by k ) Let and be two matrices having the same number of rows and the same number of columns. To add two matrices A and B For example,

7. Subtraction of two matrices Matrix multiplication

8. Matrix division is not defined

9. Matrix operations satisfy the following laws. The relative sizes of these matrices are such that the indicated operations are defined. Transpose operations This operation involves nothing more than interchanging the rows and columns of the matrix.

10. Special kinds of matrices Identity matrix where I is assigned the appropriate number of rows and columns in each case for the multiplication operation to be defined. The identity matrix I is a square matrix whose elements are 0s except for 1s along the main diagonal. ( A square matrix is one in which the number of rows is equal to the number of columns).

11. Null matrix The null matrix 0 is a matrix of any size whose elements are all 0s.

12. Inverse of matrix

13. Vectors (We use boldface lowercase letters to represent vectors)

14. Partitioning of matrices Up to this point, matrices have been rectangular arrays of elements, each of which is a number. However, the notation and results are also valid if each element is itself a matrix. For example, the matrix

16. Example : Calculate AB, given

17. Matrix Form of Linear Programming Original Form of the ModelAugmented Form of the Model

19. Solving for a Basic Feasible Solution For initialization, For any iteration,

20. Solving for a Basic Feasible Solution For initialization, Bx B + Nx N = b Bx B = b - Nx N x B = B -1 b – B -1 Nx N x B = B -1 b Z = c B x B + c N x N = c B x B = c B B -1 b x B = B -1 b Z = c B B -1 b x B = x = I -1 b = b Z = c B I -1 b = c B b For any iteration,

21. Example x B = B -1 b Z = c B B -1 b x B = x = I -1 b = b Z = c B I -1 b = c B b

22. Matrix Form of the Set of Equations in the Simplex Tableau For the original set of equations, the matrix form is x B = B -1 b Z = c B B -1 b For any iteration,

23. Example For Iteration 2

24. Summary of the Revised Simplex Method 1. Initialization (Iteration 0) Optimality test:

25. 2. Iteration 1 Step 1: Determine the entering basic variable So x 2 is chosen to be the entering variable. Step 2: Determine the leaving basic variable Thus, x 4 is chosen to be the entering variable. So the number of the pivot row r =2

26. The new set of basic variables is To obtain the new B -1, So the new B -1 is Step 3: Determine the new BF solution

27. Optimality test: The nonbasic variables are x 1 and x 4. 3. Iteration 2 Step 1: Determine the entering basic variable x 1 is chosen to be the entering variable.

28. Step 2: Determine the leaving basic variable The ratio 4/1 > 6/3 indicate that x5 is the leaving basic variable Therefore, the new B -1 is The new set of basic variables is Step 3: Determine the new BF solution Optimality test: The nonbasic variables are x 4 and x 5.

29. Relationship between the initial and final simplex tableaux

30. For iteration 1: S* = B -1 = y* =

31. For iteration 2: S* = B -1 = y* =

32. DUAL SIMPLEX

33. HUGHES-MCMAKEE- NOTES\CHAPTER-05.PDF

34. Duality Theory and Sensitivity Analysis Duality Theory

36. is the surplus variable for the functional constraints in the dual problem.

37. If a solution for the primal problem and its corresponding solution for the dual problem are both feasible, the value of the objective function is optimal. If a solution for the primal problem is feasible and the value of the objective function is not optimal (for this example, not maximum), the corresponding dual solution is infeasible.

38. Summary of Primal-Dual Relationships

42. F G H C D B AE C D B A E G F H Primal Problem Dual Problem

44. Suboptimal Superoptimal Optimal Superptimal Suboptimal Optimal Neither feasible nor superoptimal

46. Adapting to Other Primal Forms

49. subject to (1) (2) : dual variables corresponding to (1) : dual variables corresponding to (2) subject to : unconstrained in sign

50. subject to : dual variables corresponding to (2) subject to

53. Dual Simplex Method Suboptimal Superoptimal Optimal Superptimal Suboptimal Optimal

54. Simplex Method : Keep the solution in any iteration suboptimal ( not satisfying the condition for optimality, but the condition for feasibility). Dual Simplex Method : Keep the solution in any iteration superoptimal ( not satisfying the condition for feasibility, but the condition for optimality). If a solution satisfies the condition for optimality, the coefficients in row (0) of the simplex tableau must nonnegative. If a solution does not satisfy the condition for feasibility, one or more of the values of b in the right-side of simplex tableau must be negative.

55. Summary of Dual Simplex Method subject to

56. Sensitivity Analysis

60. Case 1 : Changes in b i

62. Incremental analysis

63. The dual simplex method now can be applied to find the new optimal solution.

64. The allowable range of b i to stay feasible The solution remains feasible only if A B C

65. Case 2a : Changes in the coefficients of a nonbasic variable Consider a particular variable x j (fixed j) that is a nonbaic variable in the optimal solution shown by the final simplex tableau. is the vector of column j in the matrix A. We havefor the revised model. We can observe that the changes lead to a single revised constraint for the dual problem.

66. The allowable range of the coefficient c i of a nonbasic variable

67. Case 2b : Introduction of a new variable

68. Case 3 : Changes in the coefficients of a basic variable

70. The allowable range of the coefficient c i of a basic variable

71. Case 4 : Introduction of a new constraint

72. Parametric Linear Programming Systematic Changes in the c j Parameters The objective function of the ordinary linear programming model is For the case where the parameters are being changed, the objective function of the ordinary linear programming model is replaced by where  is a parameter and  j are given input constants representing the relative rates at which the coefficients are to be changed.

73. Example: To illustrate the solution procedure, suppose  1 =2 and  2 = -1 for the original Wyndor Glass Co. problem, so that Beginning with the final simplex tableau for  = 0, we see that its Eq. (0) If  ≠ 0, we have

74. Because both x 1 and x 2 are basic variables, they both need to be eliminated algebraically from Eq. (0) The optimality test says that the current BF solution will remain optimal as long as these coefficients of the nonbasic variables remain nonnegative:

75. Summary of the Parametric Linear Programming Procedure for Systematic Changes the c j Parameters

76. Systematic Changes in the b i Parameters For the case where the b i parameters change systematically, the one modification made in the original linear programming model is that is replaced by, for i = 1, 2, …, m, where the  i are given input constants. Thus the problem becomes subject to The goal is to identify the optimal solution as a function of 

77. Example: subject to Suppose that  1 =2 and  2 = -1 so that the functional constraints become This problem with  = 0 has already been solved in the table, so we begin with the final tableau given there.

78. Using the sensitivity procedure, we find that the entries in the right side column of the tableau change to the values given below Therefore, the two basic variables in this tableau Remain nonnegative for

79. Summary of the Parametric Linear Programming Procedure for Systematic Changes the b i Parameters