# Characterizing path-like trees from linear configurations

**Authors:** Susana-Clara L\'opez, Francesc-Antoni Muntaner-Batle

arXiv: 1705.08802 · 2018-03-23

## TL;DR

This paper characterizes a special class of trees called path-like trees, which can be embedded in a 2D grid and obtained through elementary transformations, focusing on those with maximum degree 3 and an even number of degree 3 vertices.

## Contribution

It provides a characterization of path-like trees with maximum degree 3 based on their linear configurations and the parity of degree 3 vertices.

## Key findings

- Path-like trees can be constructed from grid embeddings via elementary transformations.
- Characterization applies specifically to trees with maximum degree 3.
- The paper identifies conditions for trees with an even number of degree 3 vertices.

## Abstract

Assume that we embed the path $P_n$ as a subgraph of a $2$-dimensional grid, namely, $P_k \times P_l$. Given such an embedding, we consider the ordered set of subpaths $L_1, L_2, \ldots , L_m$ which are maximal straight segments in the embedding, and such that the end of $L_i$ is the beginning of $L_{i+1}$. Suppose that $L_i\cong P_2$, for some $i$ and that some vertex $u$ of $L_{i-1}$ is at distance $1$ in the grid to a vertex $v$ of $L_{i+1}$. An elementary transformation of the path consists in replacing the edge of $L_i$ by a new edge $uv$. A tree $T$ of order $n$ is said to be a path-like tree, when it can be obtained from some embedding of $P_n$ in the $2$-dimensional grid, by a sequence of elementary transformations. Thus, the maximum degree of a path-like tree is at most $4$.   Intuitively speaking, a tree admits a linear configuration if it can be described by a sequence of paths in such a way that only vertices from two consecutive paths, which are at the same distance of the end vertices are adjacent. In this paper, we characterize path-like trees of maximum degree $3$, with an even number of vertices of degree $3$, from linear configurations.

## Full text

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## Figures

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## References

15 references — full list in the complete paper: https://tomesphere.com/paper/1705.08802/full.md

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Source: https://tomesphere.com/paper/1705.08802