Learning Decision Trees using the Fourier Spectrum

1. Learning Decision Treesusing the Fourier Spectrum By Eyal Kushilevitz Yishay Mansour Haim Kermany

2. What is Learning

3. What are we Learning? • Term (and of literals( • DNF (or of terms) • DT , : See latter

4. Does always All inputs We Want: Randomized Algorithm Do we always succeed ?

5. What we want

6. (1+ 1)mod 2=0 Fourier Transform

7. t-phase function – a function that has at most t Fourier coefficient t-phase function Only big coefficients Very small

9. Tree What we need

10. Finding only big coefficients

11. Analyzing coef()

12. Changing coef()

13. Approximating chernoff

14. Proof:

15. Approximating MQ

16. Changing coef() Save Side

17. chernoff Finding

18. Coef() output

19. There will be coefficients Running time is Coaf() time

20. Finding chernoff

21. Conclusion

22. How to find h(x)

23. Can be exp(n) Best algorithm ever

24. +1 -1 -1 -1 -1 -1 +1 +1 +1 +1 +1 Decision Tree (DT)

25. Decision Tree (DT) Proof:

26. choose: Exacting

27. Final Result