Abstract
AbstractLet G be a doubly connected domain in the complex plane $$\mathbb {C}$$
C
, bounded by Ahlfors 1-regular curves. In this study the approximation of the functions by Faber–Laurent rational functions in the $$\omega $$
ω
-weighted generalized grand Smirnov classes $$\mathcal {E}^{p),\theta }(G,\omega )$$
E
p
)
,
θ
(
G
,
ω
)
in the term of the rth$$,~r=1,2\ldots ,$$
,
r
=
1
,
2
…
,
mean modulus of smoothness are investigated.
Publisher
Springer Science and Business Media LLC
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