Abstract
It is known that the Sylow subgroups of a Frobenius complement are cyclic or generalized quaternion. In this paper it is shown that there are no restrictions at all on the structure of the Sylow subgroups of the Frobenius-Wielandt complements that appear in the well-known Wielandtâs generalization of Frobeniusâ Theorem. Some examples of explicit constructions are also given.
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