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On Wiman's theorem for graphs

  1. NázovOn Wiman's theorem for graphs
    Aut.údajeAlexander Mednykh, Ilya Mednykh
    Autor Mednykh Alexander 1953- (75%) UMBFP10 - Katedra matematiky
    Spoluautori Mednykh Ilya (25%)
    Zdroj.dok. Discrete Mathematics. Vol. 338, no. 10 special issue (2015), pp. 1793-1800. - Amsterdam : Elsevier B.V., 2015 ; Czech-Slovak international symposium on graph theory, combinatorics, algorithms and applications medzinárodné sympózium
    Kľúč.slová matematika - mathematics   grafy - charts - graphs  
    Jazyk dok.angličtina
    KrajinaHolandsko
    Systematika 51
    Anotácia© 2015 Elsevier B.V.Abstract The aim of the paper is to find discrete versions of the Wiman theorem which states that the maximum possible order of an automorphism of a Riemann surface of genus g≥2 is 4g+2. The role of a Riemann surface in this paper is played by a finite connected graph. The genus of a graph is defined as the rank of its homology group. Let ZinfN/inf be a cyclic group acting freely on the set of directed edges of a graph X of genus g≥2. We prove that N≤2g+2. The upper bound N=2g+2 is attained for any even g. In this case, the signature of the orbifold X/ZinfN/inf is (0;2,g+1), that is X/ZinfN/inf is a tree with two branch points of order 2 and g+1 respectively. Moreover, if N<2g+2, then N≤2g. The upper bound N=2g is attained for any g≥2. The latter takes a place when the signature of the orbifold X/ZinfN/inf is (0;2,2g).
    Kategória publikačnej činnosti AFC
    Číslo archívnej kópie36748
    Katal.org.BB301 - Univerzitná knižnica Univerzity Mateja Bela v Banskej Bystrici
    Báza dátxpca - PUBLIKAČNÁ ČINNOSŤ
    OdkazyPERIODIKÁ-Súborný záznam periodika
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