In this paper, we use a new and correct method to determine the $n$-vertex $k$-trees with the first three largest signless Laplacian indices.
Let $A(G)$ be the adjacency matrix of a graph $G$ with $lambda_{1}(G)$, $lambda_{2}(G)$, ..., $lambda_{n}(G)$ being its eigenvalues in non-increasing order. Call the number $S_k(G):=sum_{i=1}^{n}lambda_{i}^k(G) (k=0,1,...,n-1)$ the $k$th spectral mom
ent of $G$. Let $S(G)=(S_0(G),S_1(G),...,S_{n-1}(G))$ be the sequence of spectral moments of $G$. For two graphs $G_1$ and $G_2$, we have $G_1prec_sG_2$ if $S_i(G_1)=S_i(G_2) (i=0,1,...,k-1)$ and $S_k(G_1)<S_k(G_2)$ for some $kin {1,2,...,n-1}$. Denote by $mathscr{G}_n^k$ the set of connected $n$-vertex graphs with $k$ cut edges. In this paper, we determine the first, the second, the last and the second last graphs, in an $S$-order, among $mathscr{G}_n^k$, respectively.
