Logo - springer
Slogan - springer

New & Forthcoming Titles | Investigations in Algebraic Theory of Combinatorial Objects

Investigations in Algebraic Theory of Combinatorial Objects

Faradzev, I.A., Ivanov, A.A., Klin, M., Woldar, A.J. (Eds.)

1994, XII, 510 p.

Available Formats:
eBook
Information

Springer eBooks may be purchased by end-customers only and are sold without copy protection (DRM free). Instead, all eBooks include personalized watermarks. This means you can read the Springer eBooks across numerous devices such as Laptops, eReaders, and tablets.

You can pay for Springer eBooks with Visa, Mastercard, American Express or Paypal.

After the purchase you can directly download the eBook file or read it online in our Springer eBook Reader. Furthermore your eBook will be stored in your MySpringer account. So you can always re-download your eBooks.

 
$149.00

(net) price for USA

ISBN 978-94-017-1972-8

digitally watermarked, no DRM

Included Format: PDF

download immediately after purchase


learn more about Springer eBooks

add to marked items

Hardcover
Information

Hardcover version

You can pay for Springer Books with Visa, Mastercard, American Express or Paypal.

Standard shipping is free of charge for individual customers.

 
$189.00

(net) price for USA

ISBN 978-0-7923-1927-6

free shipping for individuals worldwide

usually dispatched within 3 to 5 business days


add to marked items

Softcover
Information

Softcover (also known as softback) version.

You can pay for Springer Books with Visa, Mastercard, American Express or Paypal.

Standard shipping is free of charge for individual customers.

 
$189.00

(net) price for USA

ISBN 978-90-481-4195-1

free shipping for individuals worldwide

usually dispatched within 3 to 5 business days


add to marked items

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.

Content Level » Research

Keywords » Graph - Graph theory - Node - Permutation - Vertices - algebra - classification

Related subjects » Algebra

Table of contents 

Series Editor's Preface. Preface to the English Edition. Preface to the Russian Edition. Part 1: Cellular Rings. 1.1. Cellular Rings and Groups of Automorphisms of Graphs; I.A. Faradzev, M.H. Klin, M.H. Muzichuk. 1.2 On p-Local Analysis of Permutation Groups; V.A. Ustimenko. 1.3. Amorphic Cellular Rings; Ja. Ju. Gol'fand, A.V. Ivanov, M.H. Klin. 1.4 The Subschemes of the Hamming Scheme; M.E. Muzichuk. 1.5. A Description of Subrings in V(Sp1 x Sp2 x ... x Spm); Ja. Ju. Gol'fand. 1.6. Cellular Subrings of the Symmetric Square of a Cellular Ring of Rank 3; I.A. Faradzev. 1.7. The Intersection Numbers of the Hecke Algebras H(PGLn(q),BWjB); V.A. Ustimenko. 1.8. Ranks and Subdegrees of the Symmetric Groups Acting on Partitions; I.A. Faradzev, A.V. Ivanov. 1.9. Computation of Lengths of Orbits of a Subgroup in a Transitive Permutation Group; A.A. Ivanov. Part 2: Distance-Transitive Graphs. 2.1. Distance-Transitive Graphs and Their Classification; A.A. Ivanov. 2.2. On Some Local Characteristics of Distance-Transitive Graphs; A.V. Ivanov. 2.3. Action of the Group M12 on Hadamard Matrices; I.V. Chuvaeva, A.A. Ivanov. 2.4. Construction of an Automorphic Graph on 280 Vertices Using Finite Geometries; F.L. Tchuda. Part 3: Amalgams and Diagram Geometries. 3.1. Applications of Group Amalgams to Algebraic Graph Theory; A.A. Ivanov, S.V. Shpectorov. 3.2. A Geometric Characterization of the Group M22; S.V. Shpectorov. 3.3. Bi-Primitive Cubic Graphs; M.E. Lofinova, A.A. Ivanov. 3.4. On Some Properties of Geometries of Chevalley Groups and Their Generalizations; V.A. Ustimenko. Subject Index.

Popular Content within this publication 

 

Articles

Read this Book on Springerlink

Services for this book

New Book Alert

Get alerted on new Springer publications in the subject area of Discrete Mathematics.