Independence Theory in Combinatorics: An Introductory Account with Applications to Graphs and Transversals (Chapman and Hall Mathematics)
معرفی کتاب «Independence Theory in Combinatorics: An Introductory Account with Applications to Graphs and Transversals (Chapman and Hall Mathematics)» نوشتهٔ Victor Bryant and Hazel Perfect، منتشرشده توسط نشر Springer Netherlands در سال 1980. این کتاب در فرمت djvu، زبان انگلیسی ارائه شده است.
Combinatorics may very loosely be described as that branch of mathematics which is concerned with the problems of arranging objects in accordance with various imposed constraints. It covers a wide range of ideas and because of its fundamental nature it has applications throughout mathematics. Among the well-established areas of combinatorics may now be included the studies of graphs and networks, block designs, games, transversals, and enumeration problem s concerning permutations and combinations, from which the subject earned its title, as weil as the theory of independence spaces (or matroids). Along this broad front,various central themes link together the very diverse ideas. The theme which we introduce in this book is that of the abstract concept of independence. Here the reason for the abstraction is to unify; and, as we sh all see, this unification pays off handsomely with applications and illuminating sidelights in a wide variety of combinatorial situations. The study of combinatorics in general, and independence theory in particular, accounts for a considerable amount of space in the mathematical journais. For the most part, however, the books on abstract independence so far written are at an advanced level, ·whereas the purpose of our short book is to provide an elementary in troduction to the subject. Combinatorics may very loosely be described as that branch of mathematics which is concerned with the problems of arranging objects in accordance with various imposed constraints. It covers a wide range of ideas and because of its fundamental nature it has applications throughout mathematics. Among the well-established areas of combinatorics may now be included the studies of graphs and networks, block designs, games, transversals, and enumeration problem s concerning permutations and combinations, from which the subject earned its title, as weil as the theory of independence spaces (or matroids). Along this broad front, various central themes link together the very diverse ideas. The theme which we introduce in this book is that of the abstract concept of independence. Here the reason for the abstraction is to unify; and, as we sh all see, this unification pays off handsomely with applications and illuminating sidelights in a wide variety of combinatorial situations. The study of combinatorics in general, and independence theory in particular, accounts for a considerable amount of space in the mathematical journais. For the most part, however, the books on abstract independence so far written are at an advanced level, ·whereas the purpose of our short book is to provide an elementary inƯ troduction to the subject Combinatorics may very loosely be described as that branch of mathematics which is concerned with the problems of arranging object in accordance with various imposed constraints. The theme which is introduced in this book is that of the abstract concept of independence. Here the reason for the abstraction is to unify; this unification pays off handsomely with applications and illuminating sidelights in a wide variety of combinatorial situations. The purpose of this short book is to provide an elementary introduction to the subject. It is intended primarily as a text book for undergraduates or as a basis of a postgraduate course. Within its limited compass, it presents the basic notions and to describe just a few of the varied applications of this very attractive branch of mathematics Victor Bryant And Hazel Perfect. Includes Index. Bibliography: P. 139. Book by Bryant, Victor, Perfect, Hazel
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