Commutator subgroup of Sylow 2-subgroups of alternating group and the commutator width in the wreath product

It is proved that the commutator length of an arbitrary element of the iterated wreath product of cyclic groups $C_{p_i}, ~ p_i\in \mathbb{N} $, is equal to $1$. The commutator width of direct limit of wreath product of cyclic groups is found. This paper gives upper bounds of the commutator width $(cw(G))$ [1] of a wreath product of groups. A presentation in the form of wreath recursion [6] of Sylow $2$-subgroups $Syl_2A_{{2^{k}}}$ of $A_{{2^k}}$ is introduced. As a corollary, we obtain a short proof of the result that the commutator width is equal to $1$ for Sylow $2$-subgroups of the alternating group ${A_{{2^{k}}}}$, where $k>2$, permutation group ${S_{{2^{k}}}}$ and for Sylow $p$-subgroups $Syl_2 A_{p^k}$ and $Syl_2 S_{p^k}$. The commutator width of permutational wreath product $B \wr C_n$ is investigated. An upper bound of the commutator width of permutational wreath product $B \wr C_n$ for an arbitrary group $B$ is found.