Esther Banaian scite author profile

Juggling patterns can be described by a closed walk in a (directed) state graph, where each vertex (or state) is a landing pattern for the balls and directed edges connect states that can occur consecutively. The number of such patterns of length n is well known, but a long-standing problem is to count the number of prime juggling patterns (those juggling patterns corresponding to cycles in the state graph). For the case of b = 2 balls we give an expression for the number of prime juggling patterns of length n by establishing a connection with partitions of n into distinct parts. From this we show the number of two-ball prime juggling patterns of length n is γ −o(1) 2 n where γ = 1.32963879259 . . .. For larger b we show there are at least b n−1 prime cycles of length n.

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A generalization of Eulerian numbers via rook placements

Banaian

Butler

Cox

et al. 2017

Involve

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We consider a generalization of Eulerian numbers which count the number of placements of $cn$ "rooks" on an $n\times n$ board where there are exactly $c$ rooks in each row and each column, and exactly $k$ rooks below the main diagonal. The standard Eulerian numbers correspond to the case $c=1$. We show that for any $c$ the resulting numbers are symmetric and give generating functions of these numbers for small values of $k$.Comment: 15 page

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Esther Banaian

Snake Graphs from Triangulated Orbifolds

Counting Prime Juggling Patterns

A generalization of Eulerian numbers via rook placements

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