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0 , we study the case when all the irreducible constituents of XnXm are linear. Mann proved that if G is a finite non-abelian group with an irreducible character X such that all the irreducible constituents of X2 are linear, then G0 , and if X is an irreducible character of G, then all the irreducible constituents of XnXm are linear if and only if G
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p. 67−83
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