The integer group determinants for GA(1,q)
Abstract
We show that the integer group determinants for the general affine group of degree one, GA(1,q) with q=pk a prime power, take the form D=ABq-1, where A is a Zq-1 integer group determinant and B A q. This generalizes the result for k=1. When 2k-1 is a Mersenne prime we show that this condition is both necessary and sufficient for GA(1,2k). The same is true for GA(1,9) and GA(1,27).
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