This textbook is intended to be accessible to any second-year undergraduate in mathematics who has attended courses on basic real analysis and linear algebra. It is meant to help students to appreciate the diverse specialized mathematics courses offered at their universities. Special emphasis is on similarities between mathematical fields and ways to compare them. The organizing principle is the concept of a mathematical structure which plays an important role in all areas of mathematics.
The mathematical content used to explain the structural ideas covers in particular material that is typically taught in algebra and geometry courses. The discussion of ways to compare mathematical fields also provides introductions to categories and sheaves, whose ever-increasing role in modern mathematics suggests a more prominent role in teaching.
The book is the English translation of the second edition of “Mathematische Strukturen” (Springer, 2024) written in German. The translation was done with the help of artificial intelligence. A subsequent human revision was done primarily in terms of content.
Les mer
The discussion of ways to compare mathematical fields also provides introductions to categories and sheaves, whose ever-increasing role in modern mathematics suggests a more prominent role in teaching.The book is the English translation of the second edition of “Mathematische Strukturen” (Springer, 2024) written in German.
Les mer
I Algebraic Structures.- 1 Rings.- 2 Modules.- 3 Multilinear Algebra.- 4 Pattern Recognition.- II Local Structures.- 5 Sheaves.- 6 Manifolds.- 7 Algebraic Varieties.- III Outlook.- 8 Transfer of Arguments and Structures.- 9 Specialization, Generalization and Unification of Structures.
Les mer
This textbook is intended to be accessible to any second-year undergraduate in mathematics who has attended courses on basic real analysis and linear algebra. It is meant to help students to appreciate the diverse specialized mathematics courses offered at their universities. Special emphasis is on similarities between mathematical fields and ways to compare them. The organizing principle is the concept of a mathematical structure which plays an important role in all areas of mathematics.
The mathematical content used to explain the structural ideas covers in particular material that is typically taught in algebra and geometry courses. The discussion of ways to compare mathematical fields also provides introductions to categories and sheaves, whose ever-increasing role in modern mathematics suggests a more prominent role in teaching.
The Author
Joachim Hilgert is a retired professor of mathematics at the University of Paderborn.
The book is the English translation of the second edition of “Mathematische Strukturen” (Springer, 2024) written in German. The translation was done with the help of artificial intelligence. A subsequent human revision was done primarily in terms of content.
Les mer
Provides an introduction to the mathematical structures that are of great importance in modern fields such as algebraic geometry Shows the interplay of elementary structures and discusses details that are important for understanding Contains a multitude of examples
Les mer
Produktdetaljer
ISBN
9783662694114
Publisert
2024-08-07
Utgiver
Vendor
Springer-Verlag Berlin and Heidelberg GmbH & Co. K
Høyde
235 mm
Bredde
155 mm
Aldersnivå
Upper undergraduate, P, 06
Språk
Product language
Engelsk
Format
Product format
Heftet
Forfatter
Biographical note
Joachim Hilgert is a retired professor of mathematics at the University of Paderborn.