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    block this user Dainis Zeps Trusted member

    Senior Research Fellow / dainize@mii.lu.lv

    Institute of Mathematics and Computer Science
    University of Latvia
    Science and Religion Dialogue interdisciplinary group

    Combinatorial map as multiplication ofcombinatorial knots

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    Abstract We show that geometrical map can be expressed as multiplication of combinatorial maps, i.e. map P is equal to multiplication of its knot, inner knot's square and trivial knot ( = u * *2 * ss1). 1 Introduction We proceed with building combinatorial map theory that from differentpoints of view and formulations is considered in from [1] to [35]. We multiply permutations from left to right. Geometrical combinatorialmap is pair of permutations, vertex and face rotations, (

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    Title : Combinatorial map as multiplication ofcombinatorial knots
    Abstract : Abstract We show that geometrical map can be expressed as multiplication of combinatorial maps, i.e. map P is equal to multiplication of its knot, inner knot's square and trivial knot ( = u * *2 * ss1). 1 Introduction We proceed with building combinatorial map theory that from differentpoints of view and formulations is considered in from [1] to [35]. We multiply permutations from left to right. Geometrical combinatorialmap is pair of permutations, vertex and face rotations, (
    Subject : unspecified
    Area : Mathematics
    Language : English
    Affiliations
    Url : http://kam.mff.cuni.cz/~kamserie/serie/clanky/2008/s864.ps
    Doi : 10.1.1.141.4487

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