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arxiv: math/0106041 · v1 · submitted 2001-06-07 · 🧮 math.QA · math.CA

On solutions of the q-hypergeometric equation with q^(N)=1

classification 🧮 math.QA math.CA
keywords q-hypergeometricequationfunctionbasisfunctionslogarithmicpowersolutions
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We consider the q-hypergeometric equation with q^{N}=1 and $\alpha, \beta, \gamma \in {\Bbb Z}$. We solve this equation on the space of functions given by a power series multiplied by a power of the logarithmic function. We prove that the subspace of solutions is two-dimensional over the field of quasi-constants. We get a basis for this space explicitly. In terms of this basis, we represent the q-hypergeometric function of the Barnes type constructed by Nishizawa and Ueno. Then we see that this function has logarithmic singularity at the origin. This is a difference between the q-hypergeometric functions with 0<|q|<1 and at |q|=1.

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