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03761nam a22005055i 4500 |
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978-3-319-41917-6 |
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DE-He213 |
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20170106054544.0 |
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cr nn 008mamaa |
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170106s2017 gw | s |||| 0|eng d |
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|a 9783319419176
|9 978-3-319-41917-6
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|a 10.1007/978-3-319-41917-6
|2 doi
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|a QA169
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|a MAT002010
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|a 512.6
|2 23
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|a Roman, Steven.
|e author.
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|a An Introduction to the Language of Category Theory
|h [electronic resource] /
|c by Steven Roman.
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|a Cham :
|b Springer International Publishing :
|b Imprint: Birkhäuser,
|c 2017.
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| 300 |
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|a XII, 169 p. 176 illus., 5 illus. in color.
|b online resource.
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|a text
|b txt
|2 rdacontent
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|a computer
|b c
|2 rdamedia
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|a online resource
|b cr
|2 rdacarrier
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|a text file
|b PDF
|2 rda
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| 490 |
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|a Compact Textbooks in Mathematics,
|x 2296-4568
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|a Preface -- Categories -- Functors and Natural Transformations -- Universality -- Cones and Limits -- Adjoints -- References -- Index of Symbols -- Index.
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|a This textbook provides an introduction to elementary category theory, with the aim of making what can be a confusing and sometimes overwhelming subject more accessible. In writing about this challenging subject, the author has brought to bear all of the experience he has gained in authoring over 30 books in university-level mathematics. The goal of this book is to present the five major ideas of category theory: categories, functors, natural transformations, universality, and adjoints in as friendly and relaxed a manner as possible while at the same time not sacrificing rigor. These topics are developed in a straightforward, step-by-step manner and are accompanied by numerous examples and exercises, most of which are drawn from abstract algebra. The first chapter of the book introduces the definitions of category and functor and discusses diagrams, duality, initial and terminal objects, special types of morphisms, and some special types of categories, particularly comma categories and hom-set categories. Chapter 2 is devoted to functors and natural transformations, concluding with Yoneda's lemma. Chapter 3 presents the concept of universality and Chapter 4 continues this discussion by exploring cones, limits, and the most common categorical constructions – products, equalizers, pullbacks and exponentials (along with their dual constructions). The chapter concludes with a theorem on the existence of limits. Finally, Chapter 5 covers adjoints and adjunctions. Graduate and advanced undergraduates students in mathematics, computer science, physics, or related fields who need to know or use category theory in their work will find An Introduction to Category Theory to be a concise and accessible resource. It will be particularly useful for those looking for a more elementary treatment of the topic before tackling more advanced texts.
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| 650 |
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|a Mathematics.
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| 650 |
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|a Category theory (Mathematics).
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| 650 |
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|a Homological algebra.
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| 650 |
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|a Algebra.
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| 650 |
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|a Ordered algebraic structures.
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|a Mathematics.
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| 650 |
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|a Category Theory, Homological Algebra.
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| 650 |
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|a Order, Lattices, Ordered Algebraic Structures.
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| 650 |
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|a General Algebraic Systems.
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| 710 |
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|a SpringerLink (Online service)
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|t Springer eBooks
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| 776 |
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|i Printed edition:
|z 9783319419169
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| 830 |
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|a Compact Textbooks in Mathematics,
|x 2296-4568
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| 856 |
4 |
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|u http://dx.doi.org/10.1007/978-3-319-41917-6
|z Full Text via HEAL-Link
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| 912 |
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|a ZDB-2-SMA
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| 950 |
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|a Mathematics and Statistics (Springer-11649)
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