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Constrained%20Optimization

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Karush-Kuhn-Tucker (KKT) condition ... Need to change max to min. Find. Subject to. Example. Need change to. Find. Subject to. Example ... – PowerPoint PPT presentation

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Title: Constrained%20Optimization

1
Constrained Optimization

Rong Jin

2
Outline

Equality constraints
Inequality constraints
Linear Programming
Quadratic Programming

3
Optimization Under Equality Constraints

Maximum Entropy Model
English in ? French
dans (1), en (2), à (3), au cours de (4),
pendant (5)

4
Reducing variables

Representing variables using only p1 and p4
Objective function is changed
Solution p1 0.2, p2 0.3, p3 0.1, p4 0.2,
p5 0.2

5
Maximum Entropy Model for Classification

It is unlikely that we can use the previous
simple approach to solve such a general
Solution Lagrangian

6
Equality Constraints Lagrangian

Introduce a Lagrange multiplier ? for the
equality constraint
Construct the Lagrangian
Necessary condition
A optimal solution for the original optimization
problem has to be one of the stationary point of
the Lagrangian

7
Example

Introduce a Lagrange multiplier ? for constraint
Construct the Lagrangian
Stationary points

8
Lagrange Multipliers

Introducing a Lagrange multiplier for each
constraint
Construct the Lagrangian for the original
optimization problem

9
Lagrange Multiplier

We have more variables
p1, p2, p3, p4, p5 and, ?1, ?2, ?3
Necessary condition (first order condition)
A local/global optimum point for the original
constrained optimization problem ? a stationary
point of the corresponding Lagrangian

10
Stationary Points for Lagrangian
All probabilities p1, p2, p3, p4, p5 are
expressed as functions of Lagrange multipliers ?s
11
Dual Problem

p1, p2, p3, p4, p5 are expressed as functions of
?s
We can even remove the variable ?3
Put together necessary condition
Still difficult to solve

12
Dual Problem

p1, p2, p3, p4, p5 are expressed as functions of
?s
We can even remove the variable ?3
Put together necessary condition
Still difficult to solve

13
Dual Problem

Dual problem
Substitute the expression for ps into the
Lagrangian
Find the ?s that MINIMIZE the substituted
Lagrangian

14
Dual Problem
Original Lagrangian
Finding ?s such that the above objective function
is minimized
15
Dual Problem

Using dual problem
Constrained optimization ? unconstrained
optimization
Need to change maximization to minimization
Only valid when the original optimization problem
is convex/concave (strong duality)

x? When convex/concave
16
Maximum Entropy Model for Classification

Introduce a Lagrange multiplier for each linear
constraint

17
Maximum Entropy Model for Classification

Construct the Lagrangian for the original
optimization problem

18
Stationary Points
Conditional Exponential Model !
19
Dual Problem
20
Dual Problem
21
Dual Problem
22
Dual Problem
What is wrong?
23
Dual Problem
24
Dual Problem
25
Dual Problem
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Dual Problem
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Dual Problem
Minimizing L ? maximizing the log-likelihood
28
Support Vector Machine

Having many inequality constraints
Solving the above problem directly could be
difficult
Many variables w, b, ?
Unable to use nonlinear kernel function

29
Inequality Constraints Modified Lagrangian

Introduce a Lagrange multiplier ? for the
inequality constraint
Construct the Lagrangian
Karush-Kuhn-Tucker (KKT) condition
A optimal solution for the original optimization
problem will satisfy the following conditions

30
Example