TY - BOOK ID - 5451129 TI - The seventeen provers of the world AU - Wiedijk, Freek AU - Scott, Dana S. PY - 2006 VL - 3600 SN - 03029743 SN - 9783540307044 3540307044 3540328882 PB - Berlin: Springer, DB - UniCat KW - Proof theory KW - Algebra KW - Algèbre KW - Data processing. KW - Computer programs. KW - Logiciels KW - Computer programs KW - Computer Science KW - Mechanical Engineering - General KW - Engineering & Applied Sciences KW - Mathematics KW - Mechanical Engineering KW - Physical Sciences & Mathematics KW - Information Technology KW - Artificial Intelligence KW - Computer science. KW - Software engineering. KW - Mathematical logic. KW - Artificial intelligence. KW - Computer Science. KW - Artificial Intelligence (incl. Robotics). KW - Software Engineering. KW - Mathematical Logic and Formal Languages. KW - AI (Artificial intelligence) KW - Artificial thinking KW - Electronic brains KW - Intellectronics KW - Intelligence, Artificial KW - Intelligent machines KW - Machine intelligence KW - Thinking, Artificial KW - Bionics KW - Cognitive science KW - Digital computer simulation KW - Electronic data processing KW - Logic machines KW - Machine theory KW - Self-organizing systems KW - Simulation methods KW - Fifth generation computers KW - Neural computers KW - Algebra of logic KW - Logic, Universal KW - Mathematical logic KW - Symbolic and mathematical logic KW - Symbolic logic KW - Algebra, Abstract KW - Metamathematics KW - Set theory KW - Syllogism KW - Computer software engineering KW - Engineering KW - Informatics KW - Science KW - Artificial Intelligence. KW - Proof theory - Data processing KW - Algebra - Computer programs UR - https://www.unicat.be/uniCat?func=search&query=sysid:5451129 AB - Commemorating the 50th anniversary of the first time a mathematical theorem was proven by a computer system, Freek Wiedijk initiated the present book in 2004 by inviting formalizations of a proof of the irrationality of the square root of two from scientists using various theorem proving systems. The 17 systems included in this volume are among the most relevant ones for the formalization of mathematics. The systems are showcased by presentation of the formalized proof and a description in the form of answers to a standard questionnaire. The 17 systems presented are HOL, Mizar, PVS, Coq, Otter/Ivy, Isabelle/Isar, Alfa/Agda, ACL2, PhoX, IMPS, Metamath, Theorema, Leog, Nuprl, Omega, B method, and Minlog. ER -