Let fγ(x) = ∞ k=0 T k (x)/(γ) k , where (γ) k = γ(γ+1) · · · (γ+k−1) and T k (x) = cos (k arccos x) are Padé-Chebyshev polynomials. For such functions and their Padé-Chebyshev approximations π ch n,m (x; fγ), we find the asymptotics of decreasing the difference fγ(x) − π ch n, m (x; fγ) in the case where 0 m m(n), m(n) = o (n), as n → ∞ for all x ∈ [−1, 1]. Particularly, we determine that, under the same assumption, the Padé-Chebyshev approximations converge to fγ uniformly on the segment [−1, 1] with the asymptotically best rate.
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