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by I.A. Faradzev,A.A. Ivanov,M. Klin,A.J. Woldar

  • ISBN: 0792319273
  • Category: Math & Science
  • Author: I.A. Faradzev,A.A. Ivanov,M. Klin,A.J. Woldar
  • Subcategory: Mathematics
  • Other formats: mobi azw mbr txt
  • Language: English
  • Publisher: Springer; 1994 edition (November 30, 1993)
  • Pages: 510 pages
  • FB2 size: 1779 kb
  • EPUB size: 1544 kb
  • Rating: 4.2
  • Votes: 828
Download Investigations in Algebraic Theory of Combinatorial Objects (Mathematics and its Applications) fb2

Combinatorial analysis-Congresses. I. Faradzhev, I. A. II. Title. III. Ser1es: Mathmematics and its appl ications. The core of the volume is formed by the c:ollection of papers "Investigations in Algebraic Theory of Combinatorial Objects" (.

Combinatorial analysis-Congresses. Academ1c Publ ishers. Faradrev ed., Moscow, Institute for System Studies, 1985, referred below as IATC0-85. For the papers translated from IATC0-85 we indicate the corresponding pages at the end of the papers.

Klin, . Woldar, . 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, et. 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.

The 13-digit and 10-digit formats both work.

Part of the Mathematics and Its Applications book series (MASS, volume 84.

These combinatorial approximations arose repeatedly during this century under various names (Hecke algebras, centralizer rings, association schemes, coherent configurations, cellular rings, et.

Klin; . Серия: Mathematics and its Applications Язык: ENG Размер: 2. 9 x 1. 0 x . 7 .

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oceedings{ationsIA, title {Investigations in Algebraic Theory of Combinatorial Objects}, author {I. Faradzev and Alexander A Ivanov and Mikhail H. Klin and Andrew J. Woldar}, year {1994} }. Faradzev, Alexander A Ivanov, +1 author Andrew J. Woldar.

Applications of Group Amalgams to Algebraic Graph Theory; . Bi-Primitive Cubic Graphs; .

The Subschemes of the Hamming Scheme; . x Spm); Ja. Ju. Gol'fand. Applications of Group Amalgams to Algebraic Graph Theory; . A Geometric Characterization of the Group M22; . On Some Properties of Geometries of Chevalley Groups and Their Generalizations; . Learn about new offers and get more deals by joining our newsletter.

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Series: Mathematics and Its Applications 84.

Nowadays the most deeply developed is the theory of binary invariant relations and their combinatorial approximations. Series: Mathematics and Its Applications 84.

Distance-transitive graphs of valency 5, 6 and 7, USSR Comput.

Woldar, ed. Kluwer Acad. Dordrecht, 1994, 510 pp. "Interactions between algebra and combinatorics", . Klin ed. special issue of Acta Applicandae Math. vol. 29 No 1/2, 1992. Association Schemes" and "Groups and Geometries", . Ivanov e. special issues of European J. Combin. No 5, v. 14, 1993; No 1, v. 15, 1994. Distance-transitive graphs of valency 5, 6 and 7, USSR Comput. 24, (1984), pp. 67-76.

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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