On (p,q)-binomial coefficient ratios for complex parameters
Abstract
We prove local asymptotics for near-central complex (p,q)-binomial coefficient moduli ratios allowing an imaginary parameter perturbation of order n-3/4 at a n length scale from the centre. Moreover, we obtain ratio asymptotics for a smaller imaginary perturbation of order n-5/4 at the length scale n3/4. These results were obtained by reducing the two-parameter coefficients to just one parameter, giving a branch-free logarithmic representation of the second-order ratio and, hence, uniform complex curvature asymptotes for near-central ratios.
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