The q-Laplace Transforms compared: the basic confluent hypergeometric function 2φ0
Abstract
In solving q-difference equations, and in the definition of q-special functions, we encounter formal power series in which the nth coefficient is of size q-n2 with q∈(0,1) fixed. To make sense of these formal series, a q-Borel-Laplace resummation is required. There are three candidates for the q-Laplace transform, resulting in three different resummations. Surprisingly, the differences between these resummations have hardly been discussed in the literature. Our main result provides explicit formulas for these q-exponentially small differences. We also give simple Mellin--Barnes integral representations for all the basic hypergeometric rφs functions and derive a third (discrete) orthogonality condition for the Stieltjes--Wigert polynomials. As the main application, we introduce three resummations for the 2φ0 functions which can be seen as q versions of the Kummer U functions. We derive many of their properties, including interesting integral and sum representations, connection formulas, and error bounds.
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