Pad\'e approximations for products of functions
Abstract
In this article, we construct new Pad\'e approximations for the product of binomial functions and powers of logarithmic functions. While several explicit Pad\'e approximants are known for powers of exponential functions, binomial functions, and logarithmic functions individually, an explicit Pad\'e construction for the product of these functions has not yet been directly achieved. Our main result yields arithmetic applications, providing new linear independence measures for linear forms in (1+α)ωiji(1+α) for 1 i m and 0 ji ri - 1, where 0 < m, r1, …, rm ∈ Z≥ 1, ω1, …, ωm ∈ Q, and 0 ω1 < ·s < ωm < 1. These results hold with algebraic coefficients in both the complex and p-adic cases. Additionally, we establish that Pad\'e approximation of a single polylogarithm is, in general, perfect.
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