A necessary and sufficient condition for a prime to be an integer group determinant of certain p-groups

Abstract

We give a necessary and sufficient condition for a prime to be an integer group determinant for an arbitrary abelian p-group of the form Cp × H, where Cp is the cyclic group of order p. Also, we show that under certain conditions, the integer group determinant of a finite group G that is prime is the integer group determinant of the abelianization of G. As a result, we know that the integer group determinant of a p-group that is prime is the integer group determinant of its abelianization.

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