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Dick De Veaux. Williams College. My JSM Presentation. Note to self: Basically the same talk I gave somewhere else where I had about 10 times longer to give it. I hope it goes better this time where I only have 15 minutes. - PowerPoint PPT Presentation
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Dick De Veaux
My
JSM PresentationWilliams College
Note to self: Basically the same talk I gave somewhere else where I had about 10 times longer to give it. I hope it goes better this time where I only have 15 minutes.
SOME RECENT RESULTS FROM IN STATISTICS THAT I’VE EITHER COME UP WITH MYSELF OR BORROWED HEAVILY FROM THE LITERATURE.
The theory behind boosting is easy to understand via a binary classification problem. Therefore for the time being assume that the goal is to clas sify the members of some population into two categories. For instance, the goal might be to determine whether a medical patient has a certain disease or not. Typi cally these two categories are given numerical representations such that the positive outcome (the patient has the disease) equals to 1 and the negative outcome (the pa tient does not have the disease) equals to −1. Using this notation, each example can be represented with a pair (y, x), where y ∈{−1, 1} and x ∈p. The boosting algorithm starts with a constant function, e.g. the mean or median of the response values. After this, the algorithm proceeds iteratively. During every it eration it trains a weak learner (defined as a rule that can classify examples slightly better than random guessing) on a training set that weights more heavily those ex amples that the previous weak learners found difficult to classify correctly. Iterating in this manner produces a set of weak learners that can be viewed as a committee of classifiers working together to correctly classify each training example. Within the committee each weak learner has a vote on the final prediction. These votes are typically weighted such that weak learners that perform well with respect to the training set have more relative influence on the final prediction. The weighted pre dictions are then added together. The sign of this sum forms the final prediction (resulting into a prediction of either +1 or -1) of the committee. And a GREAT space and time consumer is to put lots of unnecessary bibliographic material on your visuals, especially if they point to your own previous work and you can get them into a microscopically small font like this one that even you can’t read and have NO IDEA why you ever even put it in there in the first place!!
Averaging
Statisticians and Averages
[1] Yang P.; Yang Y. H.; Zomaya A. Y. A Review of Ensemble Methods in Bioinformatics. Current Bioinformatics, 2010, 5, 296–308.[2] Okun O. Feature Selection and Ensemble Methods for Bioinformatics: Algorithmic Classification and Implementations; SMARTTECCO: Malmö, 2011.[3] Dettling M.; Buhlmann P. Boosting for Tumor Classification with Gene Expression Data. Seminar fur Statistik, 2002, 19, 1061–1069.[4] Politis D. N. In: Bagging Multiple Comparisons from Microarray Data, Proceedings of the 4th International Conference on Bioinformatics Research and Applications; Mandoiu I.; Sunderraman R.; Zelikovsky A., Eds.; Berlin/Heidelberg, Germany, 2008; pp. 492-503.[5] Hastie T.; Tibshirani R.; Friedman J. The Elements of Statistical Learning: Data Mining, Inference, and Prediction, Springer: New York, 2009.[6] Fumera G.; Fabio R.; Alessandra S. A Theoretical Analysis of Bagging as a Linear Combination of Classifiers. IEEE Transactions on Pattern Analysis and Machine Intelligence, 2008, 30, 1293–1299.[7] Duffy N.; Helmbold D. Boosting Methods for Regression. Machine Learning, 2002, 47, 153-200.[8] Breiman L. Random Forests. Machine Learning, 2001, 45, 5-32.[9] Freund Y.; Schapire R. E. A Decision-Theoretic Generalization of Online Learning and an Application to Boosting. Journal of Computer and System Sciences, 1997, 55, 119-139.
Some Background
Simulation
Results
ResponseID Good._rep Residence Advance Hours Demo_diverse Rep_race Rep_gender Diversity_ma
nage Affirm_action Heath_i
1 R_86cF9x3ftcd2deY 2000 5000 3000 5000 1000 1000 1000 2000 1000 20000
2 R_5pUnS9bwcjzcdG4 10000 5000 10000 20000 10000 0 5000 10000 5000 20000
3 R_7V8JD1kpLPQ7WsY 0 10000 10000 5000 100 100 2000 0 0 10000
4 R_ag75IPlrwZGHEsQ 5000 5000 10000 10000 0 0 0 0 500 10000
5 R_2ifNjmOwO7PFkRm 3000 5000 7000 2000 4000 2000 1000 2000 1000 3000
6 R_aeDSqohzkLu1712 10000 1000 20000 5000 300 300 0 500 100 10000
7 R_eX8APsaQt7kCnVG 10000 500 30000 10000 5000 0 500 0 0 12000
8 R_1SyE3EJUMq4o0Hq 10000 2000 15000 5000 0 0 0 0 0 15000
9 R_aYn8a7ZAYwdlTYU 1000 1000 10000 10000 0 0 0 500 2000 15000
• Our method• Performed really well• In fact, in all the data sets we found
• Our method• Was the best• Was better than the other methods
• In all the data sets we simulated• Our method
• Was the best• Out performed the other methods
• Our method• Is faster and easier to compute and has the smallest
asymptotic variance compared to the other method that we found in the literature
• So, now I’d like to show some of the results from our simulation studies where we simulated data sets and tuned our method to optimize performance comparing it to the other method which we really didn’t know how to use
Penalized Regression2
0( , , ) ( )i j jiL x y y x
Penalized Regression
Least squares2
0( , , ) ( )i j jiL x y y x
Penalized Regression
Least squares2
0( , , ) ( )i j jiL x y y x
2 20( , , ) ( )i j ji jL x y y x
Penalized Regression
Least squares
Ridge Regression
20( , , ) ( )i j jiL x y y x
2 20( , , ) ( )i j ji jL x y y x
Variations on a Regression Theme
Least squares
Ridge Regression
20( , , ) ( )i j jiL x y y x
2 20( , , ) ( )i j ji jL x y y x
20( , , ) ( )i j ji jL x y y x
Variations on a Regression Theme
Least squares
Ridge Regression
Lasso
20( , , ) ( )i j jiL x y y x
2 20( , , ) ( )i j ji jL x y y x
20( , , ) ( )i j ji jL x y y x
Stepwise Regression ReviewForward Stepwise Regression – If we standardize x’s, start with r = y
Find x most correlated with rAdd x to fit, r=y-fitFind x most correlated with rContinue until no x is correlated enough
• LAR is similar (Forward Stagewise)– Only enter as much of x as it “deserves”• Find xj most correlated with r,• βj ← βj + δj , where δj = e sign <r, xj> until another
variable is equally correlated• Move βj and βk in the direction defined by their joint
least squares coefficient of the current residual on (xj ; xk), until some other competitor x has as much correlation with the current residual.• Set r ← r − new predictions and repeat steps many times
LAR and Lasso
• Boosting fits an Additive Model • Forward Stagewise Additive Modeling
1. f0(x) = 02. For m=1,…, M
a. Compute
b. Set , 1,
( , ) argmin ( ( ) ( ; ))m m i m i iL y f x b x
1( ) ( ) ( ; )m m m i mf x f x b x
Adaboost?Adaboost is a stagewise AM with
Basis functions are just the classifiers
( ( )),( ( )) yf xL y f x e
( ) { 1, 1}mF x
Solve the Exponential Loss Problem
1( ( ) ( ))
,
,
argmin i m i iy f x F x
F
Using exponential loss solve
e
How to Solve That?
1
( ( ))( )
,
( )( )
:
argmin i i
i m i
y F xmi
F
y f xmi
Find and F
w e
where
w e
Two Steps( ( ))
( ) ( )
( )
,
argmi
arg i
n
m n
i iy F x
m mi i
F y
i
F
m
F
y F
For fixed find
w w
e
e
F
e
w
First Step( ( ))( )
( ) ( )
( ) ( )argmin ( ) ( ( ))
,
argmin
argmin
i i
m mi i i i
F all y all y
y F xmi
F
m mi i
F y F y F
For fixed find F
w e
e w e
e e w I y
w
F x e w
End of First Step( ( ))
( )
( )
( ) ( )
( ) ( )
,
argmin
argmin
argmin
argmin
( ) ( ( )
( (
)
))
i iy F xmi
F
m mi i
F y F y F
m mi i i i
F all y a
mm i i i
F al
l
l y
l y
For fixed find F
w e
e w e w
e e w I y F
F w I
x w
F
e
x
So
y
Almost There – what about ?
( ) ( )
argmin ( )
argmin( ) ( ( ))m mi i i i
all y all y
FindG
e e w I y F x e w
Take Derivative( ) (
)
)
( ( )
( ) 0
argmin ( )
( ) ( ( ))
( ) ( )
0
( )m m
m mi i i i
i i i iall y
all y all y
all y
G e e w I y F x e w
G
e e w I y F x e w
Almost There
2 ( ) 2 (
(
)
) ( )
(
( ) ( (
1 ) ( ( )) 0
)) 0m mi i i i
all y all y
m mi i i i
all y all y
e e w I y F
e w I y F x e w
x e w
Almost There
( ) ( )
( ) ( )
2 ( ) 2 (
2( )
)
( ( )
( ) ( ( )) 0
(1 ) ( ( ))
)
( ( )
0
)
m mi i i i
all y all y
m mi
m m
i i
i i i i
mi
iall y all
i i
y
e e w I y F x e w
e w I y F
w w I y F xe
w I y F x
x e w
And?
( ) ( )
2( )
( ( ))
( ( ))
11 log2
m mi i i i
m
mm
m
i i i
w w I y F xe
w I y F x
ee
Wait? What?So Adaboost
Finds the next “weak learner” that minimizes the sum of the weighted exponential missclassifications
With overall weights equal to Adds this to previous estimates11 log
2m
m
ee
Where are we?Adaboost is:
Forward stagewise additive modelWith exponential loss function
Sensitive to misclassification since we use exponential (not missclassification) loss
Now what – extend to regression?Why exponential loss?
Squared error loss is least squaresWhat’s more robust?
Absolute Error lossHuber lossTruncated loss
Next IdeaGradient Boosting MachineTake these ideas:
Loss function Find Just solve this by steepest descent
( ) ( , ( ))i iL f L y f x
ˆ argmin ( )f
f L f
Oops --- one small problemThe derviatives are based only on the
training data They won’t generalize
So calculate them and “fit” them using trees
Boosted Trees
Making it more Robust
Can handle 25% contamination to original data set
Some Applicatio
ns
Wine Data Set11 predictors and a rating
Input variables (based on physicochemical tests): 1 - fixed acidity 2 - volatile acidity 3 - citric acid 4 - residual sugar 5 - chlorides 6 - free sulfur dioxide 7 - total sulfur dioxide 8 - density 9 - pH 10 - sulphates 11 - alcohol
Output variable (based on sensory data): 12 - quality (score between 0 and 10)
Performance Under Contamination- Red Wine
Performance Under Contamination- White Wine
• Our method• Performed really well• In fact, in all the data sets we found
• Our method• Was the best• Was better than the other methods
• In all the data sets we simulated• Our method
• Was the best• Out performed the other methods
• Our method• Is faster and easier to compute and has the smallest asymptotic variance
compared to the other method that we found in the literature