The size of minimal generating set for commutator of Sylow 2-subgroup of
alternating group was found. Given a permutational wreath product of finite
cyclic groups sequence we prove that the commutator width of such groups is 1
and we research some properties of its commutator subgroup. It was shown that
$(Syl_2 A_{2^k})^2 = Syl'_2 (A_{2^k}), \, k>2$.
A new approach to presentation of Sylow 2-subgroups of alternating group
${A_{{2^{k}}}}$ was applied. As a result the short proof that the commutator
width of Sylow 2-subgroups of alternating group ${A_{{2^{k}}}}$, permutation
group ${S_{{2^{k}}}}$ and Sylow $p$-subgroups of $Syl_2 A_{p^k}$ ($Syl_2
S_{p^k}$) are equal to 1 was obtained. Commutator width of permutational wreath
product $B \wr C_n$ were investigated. It was proven that the commutator length
of an arbitrary element of commutator of the wreath product of cyclic groups
$C_{p_i}, \, p_i\in \mathbb{N} $ equals to 1. The commutator width of direct
limit of wreath product of cyclic groups are found. As a corollary, it was
shown that the commutator width of Sylows $p$-subgroups $Syl_2(S_{{p^{k}}})$ of
symmetric $S_{{p^{k}}}$ and alternating groups $A_{{p^{k}}}$ $p \geq 2$ are
also equal to 1. A recursive presentation of Sylows $2$-subgroups
$Syl_2(A_{{2^{k}}})$ of $A_{{2^{k}}}$ was introduced. The structure of Sylows
$2$-subgroups commutator of symmetric and alternating groups were investigated.
For an arbitrary group $B$ an upper bound of commutator width of $C_p \wr B$
was founded.