Investigations in Algebraic Theory of Combinatorial Objects: 84 (Mathematics and its Applications) - Tapa blanda

 
9789048141951: Investigations in Algebraic Theory of Combinatorial Objects: 84 (Mathematics and its Applications)
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ISBN 10: 9048141958 ISBN 13: 9789048141951
Editorial: Springer, 2010

Sinopsis

X Köchendorffer, L.A. Kalu:lnin and their students in the 50s and 60s. Nowadays the most deeply developed is the theory of binary invariant relations and their combinatorial approximations. These combinatorial approximations arose repeatedly during this century under various names (Hecke algebras, centralizer rings, association schemes, coherent configurations, cellular rings, etc.-see the first paper of the collection for details) andin various branches of mathematics, both pure and applied. One of these approximations, the theory of cellular rings (cellular algebras), was developed at the end of the 60s by B. Yu. Weisfeiler and A.A. Leman in the course of the first serious attempt to study the complexity of the graph isomorphism problem, one of the central problems in the modern theory of combinatorial algorithms. At roughly the same time G.M. Adelson-Velskir, V.L. Arlazarov, I.A. Faradtev and their colleagues had developed a rather efficient tool for the constructive enumeration of combinatorial objects based on the branch and bound method. By means of this tool a number of "sports-like" results were obtained. Some of these results are still unsurpassed.

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Reseña del editor

This volume presents an authoritative collection of major survey papers on algebraic combinatorics which originally appeared in Russian, augmented by four survey papers written specially for this book.
The algebraic theory of combinatorial objects is the branch of mathematics that studies the relation between local properties of a combinatorial object and the global properties of its automorphism group.
The content is divided into three parts: the first deals with cellular rings; the second deals with distance-regular and distance-transitive graphs; and part 3 contains papers on the relatively new branch of amalgams and geometry.
For complex systems theorists; mathematicians interested in group theory and combinatorics.

Reseña del editor

X Köchendorffer, L.A. Kalu:lnin and their students in the 50s and 60s. Nowadays the most deeply developed is the theory of binary invariant relations and their combinatorial approximations. These combinatorial approximations arose repeatedly during this century under various names (Hecke algebras, centralizer rings, association schemes, coherent configurations, cellular rings, etc.-see the first paper of the collection for details) andin various branches of mathematics, both pure and applied. One of these approximations, the theory of cellular rings (cellular algebras), was developed at the end of the 60s by B. Yu. Weisfeiler and A.A. Leman in the course of the first serious attempt to study the complexity of the graph isomorphism problem, one of the central problems in the modern theory of combinatorial algorithms. At roughly the same time G.M. Adelson-Velskir, V.L. Arlazarov, I.A. Faradtev and their colleagues had developed a rather efficient tool for the constructive enumeration of combinatorial objects based on the branch and bound method. By means of this tool a number of "sports-like" results were obtained. Some of these results are still unsurpassed.

"Sobre este título" puede pertenecer a otra edición de este libro.

Editorial
Springer
Año de publicación
2010
Idioma
Inglés
ISBN 10 
9048141958
ISBN 13 
9789048141951
Encuadernación
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Número de páginas
528
Editor
Faradzev I.A., Ivanov A.A., Klin M., Woldar A.J.
Contacto del fabricante
no disponible
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Otras ediciones populares con el mismo título

9780792319276: Investigations in Algebraic Theory of Combinatorial Objects: 84 (Mathematics and its Applications)

Edición Destacada

ISBN 10:  0792319273 ISBN 13:  9780792319276
Editorial: Springer, 1993
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