A semicomplete standard wreath product (Q790247)

Let \(W=AwrB\) be the standard wreath product of the finite groups A and B. In an earlier paper [ibid. 37, 499-511 (1981; Zbl 0458.20027)] the author gave a necessary and sufficient condition under which the group W is semi-complete, except when the group B is of order 2 and A is a dihedral group of the form: \(A=D_ n=<a,b| \quad a^ n=b^ 2=(ab)^ 2=1>\) with \(n=2m+1\). In the present paper is studied the above case and the following Theorem is proved: The standard wreath product \(W=D_ nwrC_ 2\) is semicomplete if and only if \(n=3\).