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Chapter 7: Transformations. Attribute Selection. Adding irrelevant attributes confuses learning algorithms---so avoid such attributes Both divide-and-conquer and separate-and-conquer algorithms suffer from this; Naïve Bayes does not suffer
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Attribute Selection • Adding irrelevant attributes confuses learning algorithms---so avoid such attributes • Both divide-and-conquer and separate-and-conquer algorithms suffer from this; Naïve Bayes does not suffer • So first choose the attributes to be considered and then proceed---dimensionality reduction • Scheme independent selection: • Just enough attributes to divide up the instance space in a way that separates all the training instances: For example, in Table 1, if we were to drop outlook, instance 1 and 4 will be inseparable-not good. --- very tedious procedure
Using machine learning algorithms for attribute selection • Decision tree: Apply DT on all attributes, and select only those that are actually used in the decisions---the selected attributes can then be used in another chosen learning algorithm • Use linear SVM algorithm that ranks attributes based on weights to choose the attributes---recursive feature elimination • Using instance-based learning methods • Sample instances randomly from the training set • Check neighboring records of the same and different classes (near hits and near misses) • If a near hit has a different value for a certain attribute, that attribute appears to be irrelevant---reduce its weight • If a near miss, has a different value, the attribute appears to be relevant and its weight should be increased • After repeating this procedure many times, selection takes place---only attributes with +ve weights are chosen.
Searching the attribute space: • Fig 7.1 • Forward selection (start with empty set and keep expanding) • Backward elimination (start with all, and start eliminating one by one) • Bidirectional search---combination of the above two • Scheme-specific selection • Cross-validation is used to measure the effectiveness of a subset of attributes
Discretizing Numeric Attributes • Global discretization: Used in 1R learning scheme: Sort the instances by the attribute’s value and assign the value into ranges at the points that class value changes---keeping some minimum instance coverage criteria • Local discretization: Used in decision trees: When a specific attribute is used to split a node, a decision is made on the value at which this break could take place • Transforming numeric attribute into k binary variables • Unsupervised discretization: Not taking the classes of the training set---break the value range into some intervals---e,g., equal-interval binning or equal-frequency binning---runs the risk of destroying distinctions within an interval or bin • Supervised discretization---takes classes into account while making intervals • Proportional k-interval discretization: #of bins chosen in a data-dependent fashion by setting it to the square root of #of instances with equal-frequency binning.
64 Y 65 N 68 Y 69 Y 70 Y 71 N 72 N 72 Y 75 Y 75 Y 80 N 81 Y 83 Y 85 N Proportional binning Number of bins = 4 64-68 Bin1 2Y 1N 69-71 Bin2 2Y 1N 72-75 Bin3 3Y 1N 80-85 Bin4 2Y 2N Equal Frequency binning Number of bins = 3 64-70 4Y 1N 71-75 3Y 2N 80-85 2Y 2N
Entropy-based Discretization • One example: Order the values of the attribute, and for each possible break-point determine the information gain (p. 298-299). Split at the point where this value is the smallest. • For all values, find the smallest (A); • Repeat this procedure for each of the parts formed by the breaking at A; • Repeat this step recursively until a stopping criteria is met
Some Useful Transformations • Examples: • Subtracting one date attribute from another to obtain a new age attribute • Converting two attributes A and B to A/B, a new attribute representing the ratio • Reduce several nominal attributes to one by concatenating their vales, producing a single k1xk2 value attribute • Principal component analysis: Use a special coordinate system that depends on the given cloud of points as follows: place the first axis in the direction of greatest variance of the points to maximize the variance along that axis; the 2nd axis in perpendicular to it; in multi-dimensional case, choose the 2nd axis that maximizes variance along that axis; and so on; finally, choose the ones that contribute to the highest variance---the principal components • http://en.wikipedia.org/wiki/Principal_components_analysis
Random Projections • Since PCA is expensive (cubic in the #of dimensions), alternative is to a random projection of the data into a subspace with a predetermined number of dimensions
Text to attribute vector • Convert a document to a vector of words that occur in the document---it could be the frequency of the words or just the absence/presence of the word • In other words, a document is characterized by the words that appear often in it.
Time series • Some times, we may replace the attributes by the difference in successive values, etc. This is time series.
Automatic Data Cleansing • Data mining techniques themselves can sometimes help to solve the problem of cleansing the corrupted data • By discarding misclassified instances from the training set, relearning, and then repeating until there are no more misclassified instances, decision trees induced from data can be improved • Robust regression---by removing outliers, linear regression is improved
Combining Multiple Models • Bagging, boosting, and stacking are prominent methods to combine multiple models • Bagging: Models receive equal weight---output of each model is a majority value, for example. • Boosting: Similar to bagging except that it assigns different weights to different model outputs • Option tree (Fig. 7.10) and Fig. 7.11 (-ve means play=yes; + ve means play=no;)
