

Counting: The Art of Enumerative Combinatorics (Undergraduate Texts in Mathematics) 
Autor: George E. Martin 
 Counting An introduction to discrete mathematics that addresses questions that begin, How many ways are there to. . . For example: How many ways are there to order a collection of 12 ice cream cones if 8 flavors are available? It can be used for college courses in combinatorics at the sophomore level for either computer science or mathematics students. 


Mathematik für Nichtmathematiker, Bd.1, Grundbegriffe, Vektorrechnung, Lineare Algebra und Matrizenrechnung, Kombinatorik, Wahrscheinlichkeitsrechnung 
Autor: Manfred Precht, Karl Voit, Roland Kraft 



Discrete And Combinatorial Mathematics: An Applied Introduction (Pb 2006) 
Autor: Ralph P. Grimaldi 
 This fifth edition continues to improve on the features that have made it the market leader. The text offers a flexible organization, enabling instructors to adapt the book to their particular courses discrete mathematics, graph theory, modern algebra, and/or combinatorics. The book is both complete and careful, and it continues to maintain its emphasis on algorithms and applications. Excellent exercise sets allow students to perfect skills as they practice. This new edition continues to feature numerous computer science applicationsmaking this the ideal text for preparing students for advanced study.
Contents same as U S/ U K editions. 


Handbook of Finite Fields (Discrete Mathematics and Its Applications, Band 78) 
Autor: Gary L. (Pennsylvania State University, University Park, USA) Mullen, Daniel (Carleton University, Ottawa, Ontario, Canada) Panario 



Computational Complexity of Counting and Sampling (Discrete Mathematics and Its Applications) 
Autor: Istvan (Renyi Institute, Budapest, Hungary) Miklos 



Coxeter Matroids (Progress in Mathematics, Band 216) 
Autor: Alexandre V. Borovik, Israel M. Gelfand, Neil White 



Höhere Mathematik für Ingenieure Band I: Analysis (TeubnerIngenieurmathematik) 
Autor: Klemens Burg 



The Tower of Hanoi  Myths and Maths 
Autor: Andreas M. Hinz, Sandi Klav?ar, Ciril Petr 
 The solitaire game " The Tower of Hanoi" was invented in the 19th century by the French number theorist Édouard Lucas. The book presents its mathematical theory and offers a survey of the historical development from predecessors up to recent research. In addition to longstanding myths, it provides a detailed overview of the essential mathematical facts with complete proofs, and also includes unpublished material, e. g. , on some captivating integer sequences. The main objects of research today are the socalled Hanoi graphs and the related Sierpinski graphs. Acknowledging the great popularity of the topic in computer science, algorithms, together with their correctness proofs, form an essential part of the book. In view of the most important practical applications, namely in physics, network theory and cognitive (neuro)psychology, the book also addresses other structures related to the Tower of Hanoi and its variants. The updated second edition includes, for the first time in English, the breakthrough reached with the solution of the " The Reve's Puzzle" in 2014. This is a special case of the famed FrameStewart conjecture which is still open after more than 75 years. Enriched with elaborate illustrations, connections to other puzzles and challenges for the reader in the form of (solved) exercises as well as problems for further exploration, this book is enjoyable reading for students, educators, game enthusiasts and researchers alike. Excerpts from reviews of the first edition: " The book is an unusual, but very welcome, form of mathematical writing: recreational mathematics taken seriously and serious mathematics treated historically. I don't hesitate to recommend this book to students, professional research mathematicians, teachers, and to readers of popular mathematics who enjoy more technical expository detail. " Chris Sangwin, The Mathematical Intelligencer 37(4) (2015) 87f. " The book demonstrates that the Tower of. . . 


Computer Graphics and Mathematics (Focus on Computer Graphics) 
Autor: B. Falcidieno, I. Herman 



Mathematik IV. Wahrscheinlichkeitsrechnung, Kombinatorik, Statistik 
Autor: Robert MüllerFonfara, Wolfgang Scholl 
 S I E H E M E I N F O T O 

