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Spirals, Tic-Tac-Toe Partition, and Deep Diagonal Maps

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  • معلومة اضافية
    • الموضوع:
      2024
    • Collection:
      Mathematics
    • نبذة مختصرة :
      The deep diagonal map $T_k$ acts on planar polygons by connecting the $k$-th diagonals and intersecting them successively. The map $T_2$ is the pentagram map and $T_k$ is a generalization. We study the action of $T_k$ on two special subsets of the so-called twisted polygons, which we name \textit{$k$-spirals of type $\alpha$ and $\beta$}. Both types of $k$-spirals are twisted $n$-gons that resemble the shape of inward spirals on the affine patch under suitable projective normalization. We show that for $k \geq 3$, $T_{k}$ preserves both types of $k$-spirals. In particular, we show that the two types of $3$-spirals have precompact forward and backward $T_3$ orbits, and these special orbits in the moduli space are partitioned into squares of a $3 \times 3$ tic-tac-toe grid. This establishes the action of $T_k$ on $k$-spirals as a nice geometric generalization of $T_2$ on convex polygons.
      Comment: 29 pages, 16 figures. Proofs are inspired by computer experiments
    • الرقم المعرف:
      edsarx.2412.15561