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Paper review of ENGG*6140 Optimization Techniques. Paper Review -- Interior-Point Methods for LP. Yanrong Hu Ce Yu Mar. 11, 2003. Outline. General introduction The original algorithm description A variant of Karmarkar’s algorithm - a detailed simple example
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Paper review of ENGG*6140 Optimization Techniques Paper Review -- Interior-Point Methods for LP Yanrong Hu Ce Yu Mar. 11, 2003
Outline • General introduction • The original algorithm description • A variant of Karmarkar’s algorithm - a detailed simple example • Another example • More issues
General introduction • Interior-point methods for linear programming: • The most dramatic new development in operations research (linear programming) during the 1980s. • Opened in 1984 by a young mathematician at AT&T Bell Labs, N. Karmarkar. • Polynomial-time algorithm and has great potential for solving huge linear programming problems beyond the reach of the simplex method. • Karmarkar’s method stimulated development in both interior-point and simplex methods.
General introduction Difference between Interior point methods and the simplex method The big difference between Interior point methods and the simplex method lies in the nature of trial solutions.
Karmarkar’s original Algorithm Karmarkar assumes that the LP is given in Canonical form of the problem: Assumptions: To apply the algorithm to LP problem in standard form, a transformation is needed. Min Z = CX s.t. AX b X 0
Karmarkar’s original Algorithm An example of transformation from standard form to canonical form Min z = y1+y2 (z=cy) s.t. y1+2y2 2 (AYb) y1, y2 0 Min z=5x1 + 5x2 s.t. 3x1+8x2+3x3-2x4=0 (AX=0) x1+ x2+ x3+ x4=1 (1X =1) xj 0, j=1,2,3,4
Karmarkar’s original Algorithm The principal idea: The algorithm creates a sequence of points having decreasing values of the objective function. In the step, the point is brought into the center of the simplex by a projective transformation.
Karmarkar’s original Algorithm The steps of Karmarkar’s algorithm are: Step 0. start with the solution point and compute the step lengthparameters Step k. Define: and compute: X is brought to the center by:
A Variant The Affine Variant of Karmarkar’s Algorithm: Concept 1: Shoot through the interior of the feasible region toward an optimal solution. Concept 2: Move in a direction that improves the objective function value at the fastest feasible rate. Concept 3: Transform the feasible region to place the current trail solution near its center, thereby enabling a large improvement when concept 2 is implemented.
An Example The Problem: Max Z= x1+ 2x2 s.t. x1+ x28 x1,x2 0 Optimal solution is (x1,x2)=(0,8) with Z=16
An Example • The algorithm begins with an initial solution that lies in the interior of the feasible region. • Arbitrarily choose (x1,x2)=(2,2) to be the initial solution. Concept 1: Shoot through the interior of the feasible region toward an optimal solution. Max Z= x1+ 2x2 s.t. x1+ x28 x1,x2 0 Concept 2: Move in a direction that improves the objective function value at the fastest feasible rate. • The direction is perpendiculars to (and toward) the objective function line. (3,4)=(2,2)+(1,2), where the vector (1,2) is the gradientof the Objective Function. • The gradient is the coefficient of the objective function.
Max Z = x1+ 2x2 s.t. x1+ x28 x1,x2 0 Max Z = x1+ 2x2 s.t. x1+ x2+ x3 = 8 x1,x2,x3 0 letting x3 be the slack An Example The algorithm actually operates on the augmented form. Max Z = cT X s.t. AX = b X 0 The augmented form can be written in general as: Initial solution: (2,2) Gradient of obj. fn.: (1,2) (2,2,4) (1,2,0)
An Example Using Projected Gradient to implement Concept 1 & 2: Show The augmented form graphically • Adding the gradient to the initial leads to (3,4,4)= (2, 2, 4)+ (1,2,0) (infeasible) • To remain feasible, the algorithm project the point (3,4,4) down onto the feasible triangle. • To do so, the projected gradient – gradient projected onto the feasible region – is used. • Then the next trial solution move in the direction of projected gradient - Feasible region : the triangle - Optimum (0,8,0), Initial solution: (2,2,4) - Gradient of Obj. fn. : cT =[ 1, 2, 0 ]
An Interior-point Algorithm Using Projected Gradient to implement Concept 1 & 2 a formula is available for computing the projected gradient: projection matrix : P = I-AT(AAT)-1A projected gradient: cp = Pc • now we are ready to move from (2,2,4) in the direction of cp to a new point: • determines how far we move. large too close to the boundary small more iterations we have chosen =0.5, so the new trial solution move to: x = ( 2, 3, 3)
An Interior-point Algorithm Centering scheme for implementing Concept 3 Why -- The centering scheme keeps turning the direction ofthe projected gradient to point more nearly toward an optimal solution as the algorithm converges toward this solution. How -- Simply changing the scale (units) for each of the variable so that the trail solution becomes equidistant from the constraint boundaries in the new coordinate system. Define D=diag{x}, Concept 3: Transform the feasible region to place the current trail solution near its center, thereby enabling a large improvement when concept 2 is implemented. bring x to the center in the new coordinate
An Interior-point Algorithm Initial trial solution (x1,x2,x3) =(2,2,4) In this new coordinate system, the problem becomes:
Summary and Illustration of the Algorithm Iteration 1. Given the initial solution (x1,x2,x3) = (2,2,4) Summary of the General Procedure Step1. given the current trial solution (x1,x2,…,xn), set X is brought to the center (1,1,1) by:
Summary and Illustration of the Algorithm Iteration 1. (cont.) Summary of the General Procedure (cont.) To compute projected gradient:
Summary and Illustration of the Algorithm Iteration 1. (cont.) Summary of the General Procedure (cont.) Compute projected gradient:
Summary and Illustration of the Algorithm Iteration 1. (cont.) step4. Determine how far to move by identify v. Then make move by calculating step4.define v as the absolute value of the negative component of cp having the largest value, so that v=|-2|=2. In this coordinate, the algorithm moves from the current trial solution to the next one.
Summary and Illustration of the Algorithm Iteration 1. (cont.) Summary of the General Procedure (cont.) Step 5. In the original coordinate, the solution is Step 5. Back to the original coordinate by calculating this completes the iteration 1. The new solution will be used to start the next iteration.
Summary and Illustration of the Algorithm Iteration 2. Given the current trial solution X is brought to the center (1,1,1,) in the new coordinate, and move to (0.83, 1.4, 0.5), corresponds (2.08, 4.92,1.0) in the original coordinate
Summary and Illustration of the Algorithm Iteration 3. Given the current trial solution x=(2.08, 4.92, 1.0) X is brought to the center (1,1,1,) in the new coordinate, and move to ( 0.54,1.30,0.50), corresponds (1. 13, 6.37, 0.5) in the original coordinate
An Example Effect of rescaling of each iteration: Sliding the optimal solution toward (1,1,1) while the other BF solutions tend to slide away. A B C D
Summary and Illustration of the Algorithm More iterations. Starting from the current trial solution x, following the steps, x is moving toward the optimum (0,8). When the trial solution is virtually unchanged from the proceeding one, then the algorithm has virtually converged to an optimal solution. So stop.
Another Example The problem MAX Z = 5x1 + 4x2 ST 6x1 + 4x2<=24 x1 + 2x2<=6 -x1 + x2<=1 x2<=2 x1, x2>=0 Augmented form MAX Z = 5x1 + 4x2 ST 6x1 + 4x2 + x3=24 x1 + 2x2 + x4=6 -x1 + x2 + x5=1 x2 + x6=2 xj>=0, j=1,2,3,4,5,6
Another Example Starting from an initial solution x=(1,1,14,3,1,1) The trial solution at each iteration
More issues • Interior-point methods is designed for dealing with big problems. Although the claim that it’s much faster than the simplex method is controversy, many tests on huge LP problems show its outperformance. • After Karmarkar’s paper, many related methods have been developed to extend the applicability of Karmarkar’s algorithm, e.g. • Infeasible interior points method -- remove the assumption that there always exits a nonempty interior. • Methods applying to LP problems in standard form.
More issues • Methods dealing with finding initial solution, and estimating the optimal solution. • Methods working with primal-dual problems. • Studies about moving step-long/short steps. • Studies about efficient implementation and complexity of various methods. • Karmarkar’s paper not only started the development of interior point methods, but also encouraged rapid improvement of simplex methods.
Reference [1] N. Karmarkar, 1984, A New Polynomial - Time Algorithm for Linear Programming, Combinatorica 4 (4), 1984, p. 373-395. [2] M.J. Todd, (1994), Theory and Practice for Interior-point method, ORSA Jounal on Computing 6 (1), 1994, p. 28-31. [3] I. Lustig, R. Marsten, D. Shanno, (1993), Interior-point Methods for Linear Programming: Computational State of the Art, ORSA Journal on Computing, 6 (1), 1994, p. 1-14. [4] Hillier,Lieberman,Introduction to Operations Research (7th edition) 320-334 [5] Taha,Operations Research: An Introduction (6th edition) 336-345 [6] E.R. Barnes, 1986, A Variation on Karmarkar’s Algorithm for Sloving Linear Programming problems, Mathematical Programming 36, 1986, p. 174-182. [7] R.J. Vanderbei, M.S. Meketon and B.A. Freeman, A Modification of karmarkar’s Linear Programming Algorithm, Algorithmica: An International Journal in Computer Science 1 (4), 1986 p. 395 – 407. [8] D. Gay (1985) A Variant of Karmarkar’s Linear Programming Algorithm for Problems in Standard form, Mathematical Programming 37 (1987) 81-90 more…
Paper Review of ENGG*6140 Optimization Techniques Thank You! Yanrong Hu Ce Yu Mar. 11 2003
