Exploring Formalisation: A Primer in Human-Readable Mathematics in Lean 3 with Examples from Simplicial...

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Clara Löh

Exploring Formalisation

A Primer in Human-Readable Mathematics in Lean 3 with Examples from Simplicial Topology

Clara Löh

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English

Springer International Publishing AG
25 September 2022

Mathematical foundations; Mathematical logic; Algebraic topology; Mathematical theory of computation; Maths for computer scientists

Series: Surveys and Tutorials in the Applied Mathematical Sciences

This primer on mathematics formalisation provides a rapid, hands-on introduction to proof verification in Lean. After a quick introduction to Lean, the basic techniques of human-readable formalisation are introduced, illustrated by simple examples on maps, induction and real numbers. Subsequently, typical design options are discussed and brought to life through worked examples in the setting of simplicial complexes (a higher-dimensional generalisation of graph theory). Finally, the book demonstrates how current research in algebraic and geometric topology can be formalised by means of suitable abstraction layers. Informed by the author's recent teaching and research experience, this book allows students and researchers to quickly get started with formalising and checking their proofs. The core material of the book is accessible to mathematics students with basic programming skills. For the final chapter, familiarity with elementarycategory theory and algebraic topology is recommended.

By: Clara Löh
Imprint: Springer International Publishing AG
Country of Publication: Switzerland
Edition: 1st ed. 2022
Volume: 11
Dimensions: Height: 235mm, Width: 155mm,
Weight: 301g
ISBN: 9783031146480
ISBN 10: 3031146484
Series: Surveys and Tutorials in the Applied Mathematical Sciences
Pages: 147
Publication Date: 25 September 2022
Audience: Professional and scholarly , Undergraduate
Format: Paperback
Publisher's Status: Active

Clara Löh is Professor of Mathematics at the University of Regensburg, Germany. Her research focuses on simplicial volume and the interaction between geometric topology, geometric group theory, and measured group theory. This includes cohomological, geometric, and combinatorial methods. She is also interested in the foundations of mathematics and the formalisation/verification of mathematics in proof assistants.