This Primer is an introduction to Homotopy Type Theory (HoTT). The original source for the ideas presented here is the ``HoTT Book'' -- Homotopy Type Theory: Univalent Foundations of Mathematics published by The Univalent Foundations Program, Institute for Advanced Study, Princeton. In what follows we freely borrow and adapt definitions, arguments and proofs from the HoTT Book throughout without always giving a specific citation.ududHowever, whereas that book provides an introduction to the subject that rapidly involves the reader in advanced technical material, the exposition in this Primer is more gently paced for the beginner. We also do more to motivate, justify, and explain some aspects of the theory in greater detail, and we address foundational and philosophical issues that the HoTT Book does not.ududIn the course of studying HoTT we developed our own approach to interpreting it as a foundation for mathematics that is independent of the homotopy interpretation of the HoTT Book though compatible with it. In particular, we interpret types as concepts; we have a slightly different understanding of subtypes and the Curry-Howard correspondence; and we offer a novel approach to the justification of the elimination rule for identity types in section 7 below (though it builds on a known mathematical result). These ideas are developed in detail in our papers downloadable from the project website: http://www.bristol.ac.uk/arts/research/current-projects/homotopy-type-theory/. While our ideas and views about some important matters differ from those presented in the HoTT Book the theory we present is essentially the same.ududPart I below introduces, explains and justifies the basic ideas, language and framework of HoTT including propositional logic, simple types, functions, quantification and identity types. In the subsequent parts of this Primer we extend the theory to predicate logic, the theory of the natural numbers, topology, the real numbers, fibre bundles, calculus and manifolds, and the very important `Univalence axiom'
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机译:本入门课程介绍了同伦类型理论(HoTT)。此处提出的想法的原始资料是``HoTT书''-同伦类型理论:数学的单价基础,由普林斯顿高等研究院的单价基础计划出版。在接下来的内容中,我们在没有始终给出具体引用的情况下自由地借用和改编了HoTT书中的定义,论据和证明。 ud ud然而,该书提供了对该主题的介绍,使读者迅速参与到高级技术材料中,对于初学者而言,本入门指南中的博览会更适中。我们还会做更多的工作来激发,证明和解释该理论的某些方面,并解决HoTT书籍所没有的基础和哲学问题。 ud ud在研究HoTT的过程中,我们开发了自己的解释方法它是数学的基础,尽管与之兼容,但与HoTT书的同伦解释无关。特别是,我们将类型解释为概念。我们对子类型和Curry-Howard对应关系的理解略有不同;并且我们在下面的第7节中提供了一种新颖的方法来证明身份类型的排除规则(尽管它基于已知的数学结果)。这些想法在可从项目网站下载的论文中得到了详细阐述:http://www.bristol.ac.uk/arts/research/current-projects/homotopy-type-theory/。虽然我们对某些重要事项的想法和观点与《 HoTT书》中提出的观点和观点有所不同,但我们提出的理论基本上是相同的。 ud ud以下第一部分介绍,解释并论证了HoTT的基本思想,语言和框架,包括命题逻辑,简单类型,功能,定量和身份类型。在本入门手册的后续部分中,我们将理论扩展到谓词逻辑,自然数,拓扑,实数,纤维束,微积分和流形的理论,以及非常重要的“单价公理”
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