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Let be an irreducible character of a group G. We denote the sum of the codegrees of the irreducible characters of G by Sc (G) = ₈ₑₑ (G) cod (). We consider the question if Sc (G) Sc (Cₙ) is true for any finite group G, where n=|G| and Cₙ is a cyclic group of order n. We show this inequality holds for many classes of groups. In particular, we provide an affirmative answer for any finite group whose order is divisible by up to 99 primes. However, we show that the question does not hold true in all cases, by evidence of a counterexample.
Lewis et al. (Mon,) studied this question.
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