Title :
Convergence of Convex Neyman-Pearson Classification
Author :
Han, Min ; Sun, Zhao-Xu
Author_Institution :
Dept. of Appl. Mathematic, Beijing Univ. of Technol., Beijing, China
Abstract :
This paper investigates Neyman-Pearson classification with convex loss function in the arbitrary class of real measurable functions. A general condition is given under which Neyman-Pearson classification with convex loss function has the same classifier as that with indicator loss function. We give analysis to NP-ERM with convex loss function and prove it´s performance guarantees. An example of complexity penalty pair about convex loss function risk in terms of Rademacher averages is studied, which produces a tight PAC bound of the NP-ERM with convex loss function.
Keywords :
pattern classification; Rademacher averages; convex Neyman-Pearson classification; convex loss function; Convergence; Costs; Finance; Loss measurement; Mathematics; Performance analysis; Performance loss; Software engineering; Sun; Testing; NP-ERM; Neyman-Pearson classification; Rademacher average; convex loss function;
Conference_Titel :
Software Engineering, 2009. WCSE '09. WRI World Congress on
Conference_Location :
Xiamen
Print_ISBN :
978-0-7695-3570-8
DOI :
10.1109/WCSE.2009.279
