On the best polynomial approximation of functions in the Hardy space 𝐻𝑞,𝑅, (1 ⩽ 𝑞 ⩽ ∞, 𝑅 ⩾ 1)

Exact inequalities are found between the best polynomial approximation of functions analytics in the disk 𝑈𝑅 :={︀𝑧 ∈ C, |𝑧| < 𝑅}︀, 𝑅 ⩾ 1 and the averaged modulus of continuity angular boundary values of the 𝑚th order derivatives. For the class 𝑊(𝑚) 𝑞,𝑅 (𝑚 ∈ Z+, 1 ⩽ 𝑞 ⩽ ∞, 𝑅 ⩾ 1) of functions 𝑓 ∈ 𝐻(𝑚) 𝑞,𝑅 whose 𝑚-order derivatives 𝑓(𝑚) belong to the Hardy space 𝐻𝑞,𝑅 and satisfy the condition ‖𝑓(𝑚)‖𝑞,𝑅 ⩽ 1, the exact values of the upper bounds of the best approximations are calculated. Moreover, for the class 𝑊(𝑚) 𝑞,𝑅 (Φ), consisting of all functions 𝑓 ∈ 𝐻(𝑚) 𝑞,𝑅 , for which any 𝑘 ∈ N, 𝑚 ∈ Z+, 𝑘 > 𝑚 the averaged moduli of continuity of the boundary values of the 𝑚th order derivative 𝑓(𝑚), dominated in the system of points {𝜋/𝑘}𝑘∈N
by the given function Φ, satisfy the condition

$$∫︁(0, 𝜋/𝑘) 𝜔(︀𝑓^(𝑚), 𝑡)︀_(𝑞,𝑅) 𝑑𝑡 ⩽ Φ(𝜋/𝑘),$$

the exact values of the Kolmogorov and Bernstein 𝑛-widths are calculated in the norm of the space 𝐻𝑞 (1 ⩽ 𝑞 ⩽ ∞).
The results obtained generalize some results of L.V.Taikov on classes of analytic functions in a circle of radius 𝑅 ⩾ 1.

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