Expectation Maximization Algorithm

1. José M. Bioucas-Dias Instituto Superior Técnico 2005 Expectation Maximization Algorithm

2. Expectation Maximization (EM) Tool Problem: Compute the MAP estimate is often very hard to compute EM approach: Approximate by a tractable iterative procedure [Dempster et. al , 77], [Little & Rubin, 87], [McLachlan and T. Krishnan, 97]

3. Complete and Missing Data Let where h is a non-invertible function such that Particular case: are termed missing data and complete data, respectively

4. A Minorization Bound for • Define • Facts: • is the Kullback-Leibler distance between the densities • Note: Given two densities p and q E

5. EM Concept

6. EM Algorithm • Define the sequence • Then is non-decreasing • Proof Maximization Kullback

7. EM Algorithm (Cont.) • Computing Q • It is not necessary to compute the second mean value (it does not depend on )

8. EM Acronym E – Expectation M – Maximization

9. Generalized EM (GEM) Algorithm • The EM rationale remains valid if we replace • with • i.e., it is not neccessary to maximaze w.r.t. It suffices to assure that increases.

10. Generalized EM (GEM) Algorithm (cont.)

11. Convergency of • Assume that is continuous on both arguments • then all limit points of • are stationary points of and the GEM sequence converges monotonically to for some stationary point [Wu, 83].

12. References • A. Dempster, N. Laird, and D. Rubin. “Maximum likelihood estimation from incomplete data via the EM algorithm.” Journal of the Royal Statistical Society B, vol. 39, pp. 1-38, 1977. • R. Little and D. Rubin. Statistical Analysis with Missing Data. John Wiley & Sons, New York, 1987 • G. McLachlan and T. Krishnan. The EM Algorithm and Extensions. John Wiley & Sons, New York, 1997. • M. Tanner. Tools for Statistical Inference. Springer-Verlag, New York, 1993. • C. Wu, “On the convergence properties of the EM algorithm,” The Annal of Statistics, vol. 11, no. 1, pp. 95-103, 1983