I'm not a graph theorist, so I apologize if some of the following terminology isn't quite correct.

Let $(T,f,v_0)$ be a complete degree $d$ rooted tree (definition at the end). 

**Definition**. Let $m\ge0$. I'll say that a subtree $S\subset T$ has **Property $\boldsymbol m$** if for all vertices $v,w\in S$, the following implication holds:
$$
\text{($f^n(v)=f^n(w)$ for some $n\ge0$)}
\quad\Longrightarrow\quad
f^m(v)=f^m(w).
$$

I am interested in knowing:

 1. Is there is a name for a subtree $S\subset T$  (that includes the
    root $v_0$) having Property $m$? 
 2. Is there a standard classification theorem or description for subtrees having Property $m$?

I've partially worked out the answer to (2), but would be happy to simply cite a result in the literature.


For example, if $S$ has Property $0$, then $S$ is what I think is called a branch of the tree.

**Definition**. A *complete degree $d$ rooted tree* is a triple $(T,f,v_0)$, where $T$ is a set of vertices, where $v_0\in T$ is the root vertex, where $f:T\setminus\{v_0\}\to T$ is a function that's used to define the directed edges $v\to f(v)$, and where $\#f^{-1}(v)=d$ for every vertex $v\in T$.