| 期刊全稱 | Advanced Topics in Term Rewriting | | 影響因子2023 | Enno Ohlebusch | | 視頻video | http://file.papertrans.cn/147/146382/146382.mp4 | | 發(fā)行地址 | First book on advanced topics in term rewriting.Covers the newest techniques for proving termination of rewrite systems.Contains a comprehensive chapter on conditional term rewriting systems.Contains | | 圖書封面 |  | | 影響因子 | Term rewriting techniques are applicable in various fields of computer sci- ence: in software engineering (e.g., equationally specified abstract data types), in programming languages (e.g., functional-logic programming), in computer algebra (e.g., symbolic computations, Grabner bases), in pro- gram verification (e.g., automatically proving termination of programs), in automated theorem proving (e.g., equational unification), and in algebra (e.g., Boolean algebra, group theory). In other words, term rewriting has applications in practical computer science, theoretical computer science, and mathematics. Roughly speaking, term rewriting techniques can suc- cessfully be applied in areas that demand efficient methods for reasoning with equations. One of the major problems one encounters in the theory of term rewriting is the characterization of classes of rewrite systems that have a desirable property like confluence or termination. If a term rewriting system is conflu- ent, then the normal form of a given term is unique. A terminating rewrite system does not permit infinite computations, that is, every computation starting from a term must end in a normal form. Therefore, in a system t | | Pindex | Textbook 2002 |
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