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OMDoc -- An Open Markup Format for Mathematical Documents [version 1.2] : Foreword by Alan Bundy / by Michael Kohlhase
(Lecture Notes in Artificial Intelligence. ISSN:29459141 ; 4180)

データ種別	電子ブック
版	1st ed. 2006.
出版者	(Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer)
出版年	2006
大きさ	XIX, 428 p : online resource
著者標目	*Kohlhase, Michael author SpringerLink (Online service)

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URL	巻　次	配架場所	請求記号	登録番号	コメント	刷　年	状　態	利用注記	ISBN	予約	請求メモ
URL		射水-電子	007	EB0004655	Computer Scinece R0 2005-6,2022-3				9783540378983

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一般注記	Setting the Stage for Open Mathematical Documents -- Setting the Stage for Open Mathematical Documents -- Document Markup for the Web -- Markup for Mathematical Knowledge -- OMDoc: Open Mathematical Documents -- An OMDoc Primer -- An OMDoc Primer -- Mathematical Textbooks and Articles -- OpenMath Content Dictionaries -- Structured and Parametrized Theories -- A Development Graph for Elementary Algebra -- Courseware and the Narrative/Content Distinction -- Communication with and Between Mathematical Software Systems -- The OMDoc Document Format -- The OMDoc Document Format -- OMDoc as a Modular Format -- Document Infrastructure (Module DOC) -- Metadata (Modules DC and CC) -- Mathematical Objects (Module MOBJ) -- Mathematical Text (Modules MTXT and RT) -- Mathematical Statements (Module ST) -- Abstract Data Types (Module ADT) -- Representing Proofs (Module PF) -- Complex Theories (Modules CTH and DG) -- Notation and Presentation (Module PRES) -- Auxiliary Elements (Module EXT) -- Exercises (Module QUIZ) -- Document Models for OMDoc -- OMDoc Applications, Tools, and Projects -- OMDoc Applications, Tools, and Projects -- OMDoc Resources -- Validating OMDoc Documents -- Transforming OMDoc by XSLT Style Sheets -- OMDoc Applications and Projects -- Changes to the Specification -- Quick-Reference Table to the OMDoc Elements -- Quick-Reference Table to the OMDoc Attributes -- The RelaxNG Schema for OMDoc -- The RelaxNG Schemata for Mathematical Objects Computers arechanging the way wethink. Of course,nearly all desk-workers have access to computers and use them to email their colleagues, search the Web for information and prepare documents. But I’m not referring to that. I mean that people have begun to think about what they do in compu- tional terms and to exploit the power of computers to do things that would previously have been unimaginable. This observation is especially true of mathematicians. Arithmetic c- putation is one of the roots of mathematics. Since Euclid’s algorithm for ?nding greatest common divisors, many seminal mathematical contributions have consisted of new procedures. But powerful computer graphics have now enabled mathematicians to envisage the behaviour of these procedures and, thereby, gain new insights, make new conjectures and explore new avenues of research. Think of the explosive interest in fractals, for instance. This has been driven primarily by our new-found ability rapidly to visualise fractal shapes, such as the Mandelbrot set. Taking advantage of these new oppor- nities has required the learning of new skills, such as using computer algebra and graphics packages HTTP:URL=https://doi.org/10.1007/11826095
件　名	LCSH:Artificial intelligence LCSH:Computer software LCSH:Computer science LCSH:Information storage and retrieval systems LCSH:Machine theory LCSH:Computer science -- Mathematics 全ての件名で検索 FREE:Artificial Intelligence FREE:Mathematical Software FREE:Theory of Computation FREE:Information Storage and Retrieval FREE:Formal Languages and Automata Theory FREE:Symbolic and Algebraic Manipulation
分　類	LCC:Q334-342 LCC:TA347.A78 DC23:006.3
書誌ID	EB00004043
ISBN	9783540378983