Linear independence of values of hypergeometric functions and arithmetic Gevrey series
Abstract
We prove new linear independence results for the values of generalized hypergeometric functions pFq at several distinct algebraic points, over suitable algebraic number fields. Our approach provides a uniform construction of Padé approximants of type II, together with a novel non-vanishing argument for generalized Wronskians of Hermite type. This method applies uniformly across all parameter regimes. Even in the case p = q+1, we extend known results from single-point to multi-points settings over general number fields, in both complex and p-adic settings. When p < q+1, we establish linear independence results over arbitrary number fields; and for p > q+1, we confirm that the values do not satisfy global linear relations in the p-adic setting in a framework of arithmetic Gevrey series. The results generalize and strengthen earlier works, demonstrating the flexibility of our Padé construction for families of contiguous hypergeometric functions, through a new non-vanishing proof for the determinant, that is crucial for the universality.
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