Details

Autor(en) / Beteiligte

• Helmbold, David P
• Schapire, Robert E
• Singer, Yoram
• Warmuth, Manfred K

Titel

A Comparison of New and Old Algorithms for a Mixture Estimation Problem

Ist Teil von

• Machine learning, 1997, Vol.27 (1), p.97-119

Ort / Verlag

Dordrecht: Springer Nature B.V

Erscheinungsjahr

1997

Quelle

SpringerLINK Contemporary (Konsortium Baden-Württemberg)

Beschreibungen/Notizen

• We investigate the problem of estimating the proportion vector which maximizes the likelihood of a given sample for a mixture of given densities. We adapt a framework developed for supervised learning and give simple derivations for many of the standard iterative algorithms like gradient projection and EM. In this framework, the distance between the new and old proportion vectors is used as a penalty term. The square distance leads to the gradient projection update, and the relative entropy to a new update which we call the exponentiated gradient update (EG^sub ^). Curiously, when a second order Taylor expansion of the relative entropy is used, we arrive at an update EM^sub ^ which, for =1, gives the usual EM update. Experimentally, both the EM^sub ^-update and the EG^sub ^-update for > 1 outperform the EM algorithm and its variants. We also prove a polynomial bound on the rate of convergence of the EG^sub ^ algorithm.[PUBLICATION ABSTRACT]