Difference between revisions of "Integer Linear Programming"
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{| cellspacing="10" | {| cellspacing="10" | ||
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− | | | + | | maximize |
| colspan="2" | <math> \sum_{i=1}^m{c_i x_i} </math> | | colspan="2" | <math> \sum_{i=1}^m{c_i x_i} </math> | ||
+ | | where <math>c_i</math> is known and <math>x_i</math> is unknown variable | ||
|- | |- | ||
− | | | + | | subject to linear equality or inequality constraints |
|- | |- | ||
− | |||
| <math> \sum_{i=1}^m{a_i x_i} \le b_i</math> | | <math> \sum_{i=1}^m{a_i x_i} \le b_i</math> | ||
− | |||
| where <math>a_i</math> and <math>b_i</math> are known | | where <math>a_i</math> and <math>b_i</math> are known | ||
|- | |- |
Revision as of 01:22, 28 September 2011
Summary
Integer Linear Programming is a method for optimizing a linear objective function:
maximize | where is known and is unknown variable | ||
subject to linear equality or inequality constraints | |||
where and are known | |||
and |
subject to linear equality or inequality constraints.
Bagging (a.k.a bootstrap aggregating) is an ensemble machine learning method introduced by Leo Brieman for classification and regression, which generates multiple versions of a predictor, by making bootstrap replications of the learning set and using them as the new learning set, and uses them to produce an aggregated predictor, which does voting over the different versions for classification and averages outcomes when predicting numerical values. Brieman showed that bagging can best improve accuracy when the predictors are good but unstable (when perturbing the learning set results in significant changes in the predictors).
Procedure
Input/Definitions:
- D - Original training set
- D_i - One of the bootstrap sample training sets
- n - Size of D
- m - Number of predictors to construct
- M - Set of trained models
- M_i - One of the trained models
Training:
- Generate m new training sets, D_i, of size n_prime < n.
- Do so by sampling from D uniformly and with replacement (a.k.a. a bootstrap sample)
- Train m models, M_i, using bootstrap sample D_i
Output Prediction:
- For Regression: Average outcome of the predictors in M
- For Classification: Vote of the predictors in M
References / Links
- Leo Brieman. Bagging Predictors. Machine Learning, 24, 123–140 (1996). - [1]
- Wikipedia article on Bagging - [2]