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Finite Geometries [Pehme köide]

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  • Formaat: Paperback / softback, 346 pages, kõrgus x laius: 234x156 mm, kaal: 640 g, 26 Illustrations, black and white
  • Ilmumisaeg: 21-Jan-2023
  • Kirjastus: Chapman & Hall/CRC
  • ISBN-10: 1032475382
  • ISBN-13: 9781032475387
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Finite GeometriesSuurem pilt
  • Formaat: Paperback / softback, 346 pages, kõrgus x laius: 234x156 mm, kaal: 640 g, 26 Illustrations, black and white
  • Ilmumisaeg: 21-Jan-2023
  • Kirjastus: Chapman & Hall/CRC
  • ISBN-10: 1032475382
  • ISBN-13: 9781032475387
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Püsilink: https://www.kriso.ee/db/9781032475387.html
Märksõnad:

Finite Geometries stands out from recent textbooks about the subject of finite geometries by having a broader scope. The authors thoroughly explain how the subject of finite geometries is a central part of discrete mathematics. The text is suitable for undergraduate and graduate courses. Additionally, it can be used as reference material on recent works.





The authors examine how finite geometries’ applicable nature led to solutions of open problems in different fields, such as design theory, cryptography and extremal combinatorics. Other areas covered include proof techniques using polynomials in case of Desarguesian planes, and applications in extremal combinatorics, plus, recent material and developments.





Features:







  • Includes exercise sets for possible use in a graduate course






  • Discusses applications to graph theory and extremal combinatorics






  • Covers coding theory and cryptography






    • Translated and revised text from the Hungarian published version




    • Finite Geometries stands out from recent textbooks on the subject of finite geometries by having a broader scope. This textbook explains the recent proof techniques using polynomials in case of Desarguesian planes.

    Definition of projective planes, examples



    Basic properties of collineations and the Theorem of Baer



    Coordination of projective planes



    Projective spaces of higher dimensions



    Higher dimensional representations



    Arcs, ovals and blocking sets



    (k, n)-arcs and multiple blocking sets



    Algebraic curves and finite geometries



    Arcs, caps, unitals and blocking sets in higher dimensional spaces



    Generalized polygons, Mobius planes



    Hyperovals



    Some applications of finite geometry in combinatorics



    Some applications of finite geometry in coding theory and cryptography

    György Kiss is an associate professor of Mathematics at Eötvös Loránd University (ELTE), Budapest, Hungary, and also at the University of Primorska, Koper, Slovenia. He is a senior researcher of the MTA-ELTE Geometric and Algebraic Combinatorics Research group. His research interests are in finite and combinatorial geometry.





    Tamás Sznyi is a Professor at the Department of Computer Science in Eötvös Loránd University, Budapest, Hungary, and also at the University of Primorska, Koper, Slovenia. He is the head of the MTA-ELTE Geometric and Algebraic Combinatorics Research Group. His primary research interests include finite geometry, combinatorics, coding theory and block designs.