Combinatorics and number theory of counting sequences
- Boca Raton : CRC Press, 2020
- xvii, 479 p. ; ill. 24 cm
- Discrete mathematics and its application .
Includes bibliographical references and index.
Combinatorics and Number Theory of Counting Sequences is an introduction to the theory of finite set partitions and to the enumeration of cycle decompositions of permutations. The presentation prioritizes elementary enumerative proofs. Therefore, parts of the book are designed so that even those high school students and teachers who are interested in combinatorics can have benefit of them. Still, the book collects vast, up-to-date information for many counting sequences (especially, related to set partitions and permutations), so it is a must-have piece for those mathematicians who do research on enumerative combinatorics. In addition, the book contains number of theoretical results on counting sequences of set partitions and permutations, so number theorists who would like to see nice applications of their area of interest in combinatorics will enjoy the book, too. Features The Outlook sections at the end of each chapter guide the reader towards topics not covered in the book, and many of the Outlook items point toward new research problems. An extensive bibliography and tables at the end make the book usable as a standard reference. Citations to results which were scattered in the literature now become easy because huge parts of the book (especially in parts II and III) appear in book form for the first time.
9781138564855
Combinatorial analysis Number theory Security Cryptography,Encryption Bell numbers Associated Bernoulli number Cauchy number Dobinski formula Exponential function Fubini number Hankel determinant Lah number Newton's inequality Pascal matrix Recursive formula Stirling cycle number Theorem of colucci Viete's formula