Title :
Fast Bundle Algorithm for Multiple-Instance Learning
Author :
Bergeron, Charles ; Moore, Gregory ; Zaretzki, Jed ; Breneman, Curt M. ; Bennett, Kristin P.
Author_Institution :
Depts. of Math. Sci. & Electr., Syst., & Comput. Eng., Rensselaer Polytech. Inst., Troy, NY, USA
fDate :
6/1/2012 12:00:00 AM
Abstract :
We present a bundle algorithm for multiple-instance classification and ranking. These frameworks yield improved models on many problems possessing special structure. Multiple-instance loss functions are typically nonsmooth and nonconvex, and current algorithms convert these to smooth nonconvex optimization problems that are solved iteratively. Inspired by the latest linear-time subgradient-based methods for support vector machines, we optimize the objective directly using a nonconvex bundle method. Computational results show this method is linearly scalable, while not sacrificing generalization accuracy, permitting modeling on new and larger data sets in computational chemistry and other applications. This new implementation facilitates modeling with kernels.
Keywords :
convex programming; gradient methods; learning (artificial intelligence); pattern classification; bundle algorithm; computational chemistry; linear-time subgradient-based methods; multiple-instance classification; multiple-instance learning; multiple-instance loss functions; multiple-instance ranking; nonconvex bundle method; smooth nonconvex optimization problems; support vector machines; Compounds; Computational modeling; Drugs; Kernel; Microwave integrated circuits; Optimization; Support vector machines; Artificial intelligence; bundle methods; machine learning; medicine and science.; multiple-instance learning; nonsmooth optimization; ranking; Algorithms; Artificial Intelligence; Humans; Neural Networks (Computer); Pattern Recognition, Automated; Support Vector Machines;
Journal_Title :
Pattern Analysis and Machine Intelligence, IEEE Transactions on
DOI :
10.1109/TPAMI.2011.194
