A tree $T$ in an edge-colored graph is a emph{proper tree} if any two adjacent edges of $T$ are colored with different colors. Let $G$ be a graph of order $n$ and $k$ be a fixed integer with $2leq kleq n$. For a vertex set $Ssubseteq V(G)$, a tree containing the vertices of $S$ in $G$ is called an emph{$S$-tree}. An edge-coloring of $G$ is called a emph{$k$-proper coloring} if for every set $S$ of $k$ vertices in $G$, there exists a proper $S$-tree in $G$. The emph{$k$-proper index} of a nontrivial connected graph $G$, denoted by $px_k(G)$, is the smallest number of colors needed in a $k$-proper coloring of $G$. In this paper, some simple observations about $px_k(G)$ for a nontrivial connected graph $G$ are stated. Meanwhile, the $k$-proper indices of some special graphs are determined, and for every pair of positive integers $a$, $b$ with $2leq aleq b$, a connected graph $G$ with $px_k(G)=a$ and $rx_k(G)=b$ is constructed for each integer $k$ with $3leq kleq n$. Also, the graphs with $k$-proper index $n-1$ and $n-2$ are respectively characterized.
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