Evaluation of two determinants involving q-integers
Abstract
The q-analogue of an integer m is given by [m]q=(1-qm)/(1-q). Let a be an integer, and let n be a positive odd integer. Via discrete Fourier transforms, we establish the following two identities: [[aj-(a+1)kn]q]1≤slant j,k≤slant n=-(a(a+1)n)q(1-3n)/2 and [[(a+1)j-akn]q]1≤slant j,k≤slant n=(a(a+1)n)q(n-1)/2, where (·n) denotes the Jacobi symbol.
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