Remote control system of a binary tree of switches -- I. constraints and inequalities

Olivier Golinelli
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Abstract

We study a tree coloring model introduced by Guidon (2018), initially based on an analogy with a remote control system of a rail yard, seen as a switch tree. For a given rooted tree, we formalize the constraints on the coloring, in particular on the minimum number of colors, and on the distribution of the nodes among colors. We show that the sequence $(a_1,a_2,a_3,\cdots)$, where $a_i$ denotes the number of nodes with color $i$, satisfies a set of inequalities which only involve the sequence $(n_0,n_1,n_2,\cdots)$ where $n_i$ denotes the number of nodes with height $i$. By coloring the nodes according to their depth, we deduce that these inequalities also apply to the sequence $(d_0,d_1,d_2,\cdots)$ where $d_i$ denotes the number of nodes with depth $i$.
开关二叉树远程控制系统 -- I. 约束条件和不等式
我们研究了 Guidon(2018)引入的树着色模型,该模型最初基于对铁路货场远程控制系统的类比,被视为开关树。对于给定的有根树,我们形式化了着色的约束,特别是颜色的最小数量,以及颜色间节点的分布。我们证明,序列 $(a_1,a_2,a_3,\cdots)$(其中 $a_i$ 表示具有颜色 $i$ 的节点数)满足一组只涉及序列 $(n_0,n_1,n_2,\cdots)$(其中 $n_i$ 表示具有高度 $i$ 的节点数)的内定式。通过根据节点的深度对节点着色,我们可以推导出这些不等式也适用于序列$(d_0,d_1,d_2,\cdots)$,其中$d_i$表示深度为$i$的节点数。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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