Fitting Penalized Logistic Regression Models Using QR Factorization

The paper presents improvement of a commonly used learning algorithm for logistic regression. In the direct approach Newton method needs inversion of Hessian, what is cubic with respect to the number of attributes. We study a special case when the number of samples m is smaller than the number of attributes n, and we prove that using previously computed QR factorization of the data matrix, Hessian inversion in each step can be performed significantly faster, that is [Formula: see text] or [Formula: see text] instead of [Formula: see text] in the ordinary Newton optimization case. We show formally that it can be adopted very effectively to [Formula: see text] penalized logistic regression and also, not so effectively but still competitively, for certain types of sparse penalty terms. This approach can be especially interesting for a large number of attributes and relatively small number of samples, what takes place in the so-called extreme learning. We present a comparison of our approach with commonly used learning tools.