This textbook presents the topics typically covered in a standard course on discrete structures. It is aimed at students of computer science and mathematics (teaching degree and Bachelor"s/Master"s) and is designed to accompany lectures, for self-study, and for exam preparation.��Through explanatory introductions to definitions, numerous examples, counterexamples, diagrams, cross-references, and outlooks, the authors manage to present the wide range of topics concisely and comprehensibly.��Numerous exercises facilitate the deepening of the material. Due to its compact presentation of all important discrete and algebraic structures and its extensive index, the book also serves as a reference for mathematicians, computer scientists, and natural scientists.��Contents: From propositional and predicate logic to sets and combinatorics, numbers, relations and mappings, graphs, to the rich spectrum of algebraic structures, and a brief introduction to category theory.
Additional chapters include rings and modules as well as matroids.��This book is a translation of the second German edition. The translation was done with the help of artificial intelligence. A subsequent human revision was done primarily in terms of content, so the book may read stylistically differently from a conventional translation.�
�1. Fundamentals .- 2. Sets and Counting .- 3. Numbers and their Representations .- 4. Relations.- 5. Mappings.- 6. Graphs.- 7. Groupoid, Semigroup, Group.- 8. From Semirings to Fields.- 9. Act, Vector Space, Extension.- 10 Rings and Modules. 11 Matroids.- 12 Categories.- Literature.- Symbols.- Index.�
�Prof. Dr. Dr. h.c. Ulrich Knauer is a retired professor of mathematics at Carl von Ossietzky University of Oldenburg (Oldenburg).Dr. habil. Kolja Knauer is an associate professor in discrete mathematics and computer science at Aix-Marseille University (France) and at the University of Barcelona (Spain).�
