TY - BOOK AU - Liu,Baoding ED - SpringerLink (Online service) TI - Uncertainty Theory: A Branch of Mathematics for Modeling Human Uncertainty T2 - Studies in Computational Intelligence, SN - 9783642139598 AV - Q342 U1 - 006.3 23 PY - 2010/// CY - Berlin, Heidelberg PB - Springer Berlin Heidelberg KW - Engineering KW - Artificial intelligence KW - Management information systems KW - Computational Intelligence KW - Artificial Intelligence (incl. Robotics) KW - e-Commerce/e-business KW - Business Information Systems N1 - Uncertainty Theory -- Uncertain Programming -- Uncertain Risk Analysis -- Uncertain Reliability Analysis -- Uncertain Process -- Uncertain Calculus -- Uncertain Differential Equation -- Uncertain Logic -- Uncertain Entailment -- Uncertain Set Theory -- Uncertain Inference N2 - Uncertainty theory is a branch of mathematics based on normality, monotonicity, self-duality, countable subadditivity, and product measure axioms. Uncertainty is any concept that satisfies the axioms of uncertainty theory. Thus uncertainty is neither randomness nor fuzziness. It is also known from some surveys that a lot of phenomena do behave like uncertainty. How do we model uncertainty? How do we use uncertainty theory? In order to answer these questions, this book provides a self-contained, comprehensive and up-to-date presentation of uncertainty theory, including uncertain programming, uncertain risk analysis, uncertain reliability analysis, uncertain process, uncertain calculus, uncertain differential equation, uncertain logic, uncertain entailment, and uncertain inference. Mathematicians, researchers, engineers, designers, and students in the field of mathematics, information science, operations research, system science, industrial engineering, computer science, artificial intelligence, finance, control, and management science will find this work a stimulating and useful reference UR - http://148.231.10.114:2048/login?url=http://link.springer.com/book/10.1007/978-3-642-13959-8 ER -