Seminars in October 2009

  • Sejeong Bang (방세정), The Bannai-Ito Conjecture

    The Bannai-Ito Conjecture
    Sejeong Bang (방세정)
    Department of Mathematics, Pusan National University, Pusan
    2009/10/30 Friday 3PM-4PM, Room 2411

    In their 1984 book “Algebraic Combinatorics I: Association Schemes”, E. Bannai and T. Ito conjectured that there are only finitely many distance-regular graphs with fixed valency k≥3.

    In the series of papers, they showed that their conjecture holds for k=3, 4, and for the class of bipartite distance-regular graphs. J. H. Koolen and V. Moulton also show that there are only finitely many distance-regular graphs with k=5, 6, or 7, and there are only finitely many triangle-free distance-regular graphs with k=8, 9 or 10. In this talk, we show that the Bannai-Ito conjecture holds for any integer k>2 (i.e., for fixed integer k>2, there are only finitely many distance-regular graphs with valency k).

    This is a joint work with A. Dubickas, J. H. Koolen and V. Moulton.

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  • Sang-il Oum (엄상일), Perfect Matchings in Claw-free Cubic Graphs

    Perfect Matchings in Claw-free Cubic Graphs
    Sang-il Oum (엄상일)
    Department of Mathematical Sciences, KAIST
    2009/10/9 Friday 4PM-5PM

    Lovász and Plummer conjectured that there exists a fixed positive constant c such that every cubic n-vertex graph with no cutedge has at least 2cn perfect matchings. Their conjecture has been verified for bipartite graphs by Voorhoeve and planar graphs by Chudnovsky and Seymour. We prove that every claw-free cubic n-vertex graph with no cutedge has more than 2n/18 perfect matchings, thus verifying the conjecture for claw-free graphs.

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