We study some combinatorial properties of \(\wr_p^k \mathcal{IS}_d\). In particular, we calculate its order, the number of idempotents and the number of \(\mathcal D\)-classes. For a given based graph \(\Gamma\subset T\) we compute the number of elements in its \(\mathcal D\)-class \(D_\Gamma\) and the number of \(\mathcal R\)- and \(\mathcal L\)-classes in \(D_\Gamma\).