CS 188: Artificial Intelligence Fall 2008 Lecture 24: Perceptrons II 11/24/2008 Dan Klein – UC Berkeley 1.

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Presentation transcript:

CS 188: Artificial Intelligence Fall 2008 Lecture 24: Perceptrons II 11/24/2008 Dan Klein – UC Berkeley 1

Feature Extractors  A feature extractor maps inputs to feature vectors  Many classifiers take feature vectors as inputs  Feature vectors usually very sparse, use sparse encodings (i.e. only represent non-zero keys) Dear Sir. First, I must solicit your confidence in this transaction, this is by virture of its nature as being utterly confidencial and top secret. … W=dear : 1 W=sir : 1 W=this : 2... W=wish : 0... MISSPELLED : 2 NAMELESS : 1 ALL_CAPS : 0 NUM_URLS :

Some (Vague) Biology  Very loose inspiration: human neurons 3

The Binary Perceptron  Inputs are feature values  Each feature has a weight  Sum is the activation  If the activation is:  Positive, output 1  Negative, output 0  f1f1 f2f2 f3f3 w1w1 w2w2 w3w3 >0? 4

Example: Spam  Imagine 4 features:  Free (number of occurrences of “free”)  Money (occurrences of “money”)  BIAS (always has value 1) BIAS : -3 free : 4 money : 2 the : 0... BIAS : 1 free : 1 money : 1 the : 0... “free money” 5

Binary Decision Rule  In the space of feature vectors  Any weight vector is a hyperplane  One side will be class 1  Other will be class -1 BIAS : -3 free : 4 money : 2 the : free money 1 = SPAM -1 = HAM 6

Multiclass Decision Rule  If we have more than two classes:  Have a weight vector for each class  Calculate an activation for each class  Highest activation wins 7

Example BIAS : -2 win : 4 game : 4 vote : 0 the : 0... BIAS : 1 win : 2 game : 0 vote : 4 the : 0... BIAS : 2 win : 0 game : 2 vote : 0 the : 0... “win the vote” BIAS : 1 win : 1 game : 0 vote : 1 the :

The Perceptron Update Rule  Start with zero weights  Pick up training instances one by one  Try to classify  If correct, no change!  If wrong: lower score of wrong answer, raise score of right answer 9

Example BIAS : win : game : vote : the :... BIAS : win : game : vote : the :... BIAS : win : game : vote : the :... “win the vote” “win the election” “win the game” 10

Examples: Perceptron  Separable Case 11

Examples: Perceptron  Separable Case 12

Mistake-Driven Classification  In naïve Bayes, parameters:  From data statistics  Have a causal interpretation  One pass through the data  For the perceptron parameters:  From reactions to mistakes  Have a discriminative interpretation  Go through the data until held-out accuracy maxes out Training Data Held-Out Data Test Data 13

Properties of Perceptrons  Separability: some parameters get the training set perfectly correct  Convergence: if the training is separable, perceptron will eventually converge (binary case)  Mistake Bound: the maximum number of mistakes (binary case) related to the margin or degree of separability Separable Non-Separable 14

Examples: Perceptron  Non-Separable Case 15

Examples: Perceptron  Non-Separable Case 16

Issues with Perceptrons  Overtraining: test / held-out accuracy usually rises, then falls  Overtraining isn’t quite as bad as overfitting, but is similar  Regularization: if the data isn’t separable, weights might thrash around  Averaging weight vectors over time can help (averaged perceptron)  Mediocre generalization: finds a “barely” separating solution 17

Fixing the Perceptron  Main problem with perceptron:  Update size  is uncontrolled  Sometimes update way too much  Sometimes update way too little  Solution: choose an update size which fixes the current mistake (by 1)…  … but, choose the minimum change 18

Minimum Correcting Update min not  =0, or would not have made an error, so min will be where equality holds 19

MIRA  In practice, it’s bad to make updates that are too large  Example may be labeled incorrectly  Solution: cap the maximum possible value of   This gives an algorithm called MIRA  Usually converges faster than perceptron  Usually performs better, especially on noisy data 20

Linear Separators  Which of these linear separators is optimal? 21

Support Vector Machines  Maximizing the margin: good according to intuition and theory.  Only support vectors matter; other training examples are ignorable.  Support vector machines (SVMs) find the separator with max margin  Basically, SVMs are MIRA where you optimize over all examples at once MIRA SVM 22

Summary  Naïve Bayes  Build classifiers using model of training data  Smoothing estimates is important in real systems  Classifier confidences are useful, when you can get them  Perceptrons / MIRA:  Make less assumptions about data  Mistake-driven learning  Multiple passes through data 23

Similarity Functions  Similarity functions are very important in machine learning  Topic for next class: kernels  Similarity functions with special properties  The basis for a lot of advance machine learning (e.g. SVMs) 24

Case-Based Reasoning  Similarity for classification  Case-based reasoning  Predict an instance’s label using similar instances  Nearest-neighbor classification  1-NN: copy the label of the most similar data point  K-NN: let the k nearest neighbors vote (have to devise a weighting scheme)  Key issue: how to define similarity  Trade-off:  Small k gives relevant neighbors  Large k gives smoother functions  Sound familiar?  [DEMO]

Parametric / Non-parametric  Parametric models:  Fixed set of parameters  More data means better settings  Non-parametric models:  Complexity of the classifier increases with data  Better in the limit, often worse in the non-limit  (K)NN is non-parametric Truth 2 Examples 10 Examples100 Examples10000 Examples 26

Collaborative Filtering  Ever wonder how online merchants decide what products to recommend to you?  Simplest idea: recommend the most popular items to everyone  Not entirely crazy! (Why)  Can do better if you know something about the customer (e.g. what they’ve bought)  Better idea: recommend items that similar customers bought  A popular technique: collaborative filtering  Define a similarity function over customers (how?)  Look at purchases made by people with high similarity  Trade-off: relevance of comparison set vs confidence in predictions  How can this go wrong? You are here 27

Nearest-Neighbor Classification  Nearest neighbor for digits:  Take new image  Compare to all training images  Assign based on closest example  Encoding: image is vector of intensities:  What’s the similarity function?  Dot product of two images vectors?  Usually normalize vectors so ||x|| = 1  min = 0 (when?), max = 1 (when?) 28

Basic Similarity  Many similarities based on feature dot products:  If features are just the pixels:  Note: not all similarities are of this form 29

Invariant Metrics This and next few slides adapted from Xiao Hu, UIUC  Better distances use knowledge about vision  Invariant metrics:  Similarities are invariant under certain transformations  Rotation, scaling, translation, stroke-thickness…  E.g:  16 x 16 = 256 pixels; a point in 256-dim space  Small similarity in R 256 (why?)  How to incorporate invariance into similarities? 30

Rotation Invariant Metrics  Each example is now a curve in R 256  Rotation invariant similarity: s’=max s( r( ), r( ))  E.g. highest similarity between images’ rotation lines 31

Tangent Families  Problems with s’:  Hard to compute  Allows large transformations (6  9)  Tangent distance:  1st order approximation at original points.  Easy to compute  Models small rotations 32

Template Deformation  Deformable templates:  An “ideal” version of each category  Best-fit to image using min variance  Cost for high distortion of template  Cost for image points being far from distorted template  Used in many commercial digit recognizers Examples from [Hastie 94] 33

A Tale of Two Approaches…  Nearest neighbor-like approaches  Can use fancy kernels (similarity functions)  Don’t actually get to do explicit learning  Perceptron-like approaches  Explicit training to reduce empirical error  Can’t use fancy kernels (why not?)  Or can you? Let’s find out! 34

The Perceptron, Again  Start with zero weights  Pick up training instances one by one  Try to classify  If correct, no change!  If wrong: lower score of wrong answer, raise score of right answer 35

Perceptron Weights  What is the final value of a weight w c ?  Can it be any real vector?  No! It’s built by adding up inputs.  Can reconstruct weight vectors (the primal representation) from update counts (the dual representation) 36

Dual Perceptron  How to classify a new example x?  If someone tells us the value of K for each pair of examples, never need to build the weight vectors! 37

Dual Perceptron  Start with zero counts (alpha)  Pick up training instances one by one  Try to classify x n,  If correct, no change!  If wrong: lower count of wrong class (for this instance), raise score of right class (for this instance) 38

Kernelized Perceptron  If we had a black box (kernel) which told us the dot product of two examples x and y:  Could work entirely with the dual representation  No need to ever take dot products (“kernel trick”)  Like nearest neighbor – work with black-box similarities  Downside: slow if many examples get nonzero alpha 39

Kernelized Perceptron Structure 40

Kernels: Who Cares?  So far: a very strange way of doing a very simple calculation  “Kernel trick”: we can substitute any* similarity function in place of the dot product  Lets us learn new kinds of hypothesis * Fine print: if your kernel doesn’t satisfy certain technical requirements, lots of proofs break. E.g. convergence, mistake bounds. In practice, illegal kernels sometimes work (but not always). 41

Properties of Perceptrons  Separability: some parameters get the training set perfectly correct  Convergence: if the training is separable, perceptron will eventually converge (binary case)  Mistake Bound: the maximum number of mistakes (binary case) related to the margin or degree of separability Separable Non-Separable 42

Non-Linear Separators  Data that is linearly separable (with some noise) works out great:  But what are we going to do if the dataset is just too hard?  How about… mapping data to a higher-dimensional space: x2x2 x x x This and next few slides adapted from Ray Mooney, UT 43

Non-Linear Separators  General idea: the original feature space can always be mapped to some higher-dimensional feature space where the training set is separable: Φ: x → φ(x) 44

Some Kernels  Kernels implicitly map original vectors to higher dimensional spaces, take the dot product there, and hand the result back  Linear kernel:  Quadratic kernel:  RBF: infinite dimensional representation  Discrete kernels: e.g. string kernels 45