Geometric properties of the Bernatsky integral operator

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In the geometric theory of complex variable functions, the study of mapping of classes of regular functions using various operators has now become an independent trend. The connection f(z)∈So ⇔ g(z) = zf'(z) ∈ S* of the classes So and S* of convex and star-shaped functions can be considered as mapping using the differential operator G[f](x) = zf'(z) of class So to class S*, that is, G: So → S* or G(So) = S*. The impetus for studying this range of issues was M. Bernatsky's assumption that the inverse operator G-1[f](x), which translates S* → So and thereby “improves” the properties of functions, maps the entire class S of single-leaf functions into itself. At present, a number of articles have been published which study the various integral operators. In particular, they establish sets of values of indicators included in these operators where operators map class S or its subclasses to themselves or to other subclasses. This paper determines the values of the Bernatsky parameter included in the generalized integral operator, at which this operator transforms a subclass of star-shaped functions allocated by the condition a

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Geometric theory of functions of a complex variable, single-leaf functions, bernatsky integral operator, convex, star-shaped and almost convex functions

Короткий адрес: https://sciup.org/147239465

IDR: 147239465   |   DOI: 10.14529/mmph220402

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