Abstract
We study the situation of a finite group G having a subgroup H with the property that each of its nonprincipal irreducible (complex) characters induce to G as a sum of irreducible characters all having the same degree. When this happens, the subgroup H either contains, or is contained in, the commutator subgroup G' of G. In any case, the normal closure HG is always proper in G whenever H is proper (even when G is perfect), and HG is solvable whenever this normal closure is a proper subgroup of G'.
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