TY - GEN N2 - Emphasizing issues of computational efficiency, Michael Kearns and Umesh Vazirani introduce a number of central topics in computational learning theory for researchers and students in artificial intelligence, neural networks, theoretical computer science, and statistics.Computational learning theory is a new and rapidly expanding area of research that examines formal models of induction with the goals of discovering the common methods underlying efficient learning algorithms and identifying the computational impediments to learning.Each topic in the book has been chosen to elucidate a general principle, which is explored in a precise formal setting. Intuition has been emphasized in the presentation to make the material accessible to the nontheoretician while still providing precise arguments for the specialist. This balance is the result of new proofs of established theorems, and new presentations of the standard proofs.The topics covered include the motivation, definitions, and fundamental results, both positive and negative, for the widely studied L. G. Valiant model of Probably Approximately Correct Learning; Occam's Razor, which formalizes a relationship between learning and data compression; the Vapnik-Chervonenkis dimension; the equivalence of weak and strong learning; efficient learning in the presence of noise by the method of statistical queries; relationships between learning and cryptography, and the resulting computational limitations on efficient learning; reducibility between learning problems; and algorithms for learning finite automata from active experimentation. AB - Emphasizing issues of computational efficiency, Michael Kearns and Umesh Vazirani introduce a number of central topics in computational learning theory for researchers and students in artificial intelligence, neural networks, theoretical computer science, and statistics.Computational learning theory is a new and rapidly expanding area of research that examines formal models of induction with the goals of discovering the common methods underlying efficient learning algorithms and identifying the computational impediments to learning.Each topic in the book has been chosen to elucidate a general principle, which is explored in a precise formal setting. Intuition has been emphasized in the presentation to make the material accessible to the nontheoretician while still providing precise arguments for the specialist. This balance is the result of new proofs of established theorems, and new presentations of the standard proofs.The topics covered include the motivation, definitions, and fundamental results, both positive and negative, for the widely studied L. G. Valiant model of Probably Approximately Correct Learning; Occam's Razor, which formalizes a relationship between learning and data compression; the Vapnik-Chervonenkis dimension; the equivalence of weak and strong learning; efficient learning in the presence of noise by the method of statistical queries; relationships between learning and cryptography, and the resulting computational limitations on efficient learning; reducibility between learning problems; and algorithms for learning finite automata from active experimentation. T1 - An introduction to computational learning theory / DA - ©1994. CY - Cambridge, Mass. : AU - Kearns, Michael J. AU - Vazirani, Umesh Virkumar. CN - Q325.5 PB - MIT Press, PP - Cambridge, Mass. : PY - ©1994. ID - 1387399 KW - Machine learning. KW - Artificial intelligence. KW - Algorithms. KW - Neural networks (Computer science) KW - COMPUTER SCIENCE/Machine Learning & Neural Networks SN - 0585350531 SN - 9780585350530 SN - 0262276860 SN - 9780262276863 TI - An introduction to computational learning theory / LK - https://univsouthin.idm.oclc.org/login?url=https://doi.org/10.7551/mitpress/3897.001.0001?locatt=mode:legacy LK - http://www.oclc.org/content/dam/oclc/forms/terms/vbrl-201703.pdf UR - https://univsouthin.idm.oclc.org/login?url=https://doi.org/10.7551/mitpress/3897.001.0001?locatt=mode:legacy UR - http://www.oclc.org/content/dam/oclc/forms/terms/vbrl-201703.pdf ER -