Weighted Last-Step Min-Max Algorithm with Improved Sub-Logarithmic RegretReportar como inadecuado



 Weighted Last-Step Min-Max Algorithm with Improved Sub-Logarithmic Regret


Weighted Last-Step Min-Max Algorithm with Improved Sub-Logarithmic Regret - Descarga este documento en PDF. Documentación en PDF para descargar gratis. Disponible también para leer online.

Descargar gratis o leer online en formato PDF el libro: Weighted Last-Step Min-Max Algorithm with Improved Sub-Logarithmic Regret
In online learning the performance of an algorithm is typically compared to the performance of a fixed function from some class, with a quantity called regret. Forster proposed a last-step min-max algorithm which was somewhat simpler than the algorithm of Vovk, yet with the same regret. In fact the algorithm he analyzed assumed that the choices of the adversary are bounded, yielding artificially only the two extreme cases. We fix this problem by weighing the examples in such a way that the min-max problem will be well defined, and provide analysis with logarithmic regret that may have better multiplicative factor than both bounds of Forster and Vovk. We also derive a new bound that may be sub-logarithmic, as a recent bound of Orabona et.al, but may have better multiplicative factor. Finally, we analyze the algorithm in a weak-type of non-stationary setting, and show a bound that is sub-linear if the non-stationarity is sub-linear as well.



Autor: Edward Moroshko; Koby Crammer

Fuente: https://archive.org/







Documentos relacionados