What question did this study set out to answer?

This research aims to derive a representation for Hadamard type operators acting on holomorphic functions with specific growth properties near domain boundaries.

June 12, 2026

Hadamard Type Operators on Spaces of Holomorphic Functions with Prescribed Behavior Near Boundary

Key Points

This research aims to derive a representation for Hadamard type operators acting on holomorphic functions with specific growth properties near domain boundaries.
Derived a multiplicative convolution representation for Hadamard type operators on holomorphic function spaces.
Explored the topological relationship between these operators and the strong dual of the space of all C^∞ functions in the corresponding domain.
Investigated the behavior of holomorphic functions on bounded convex domains with polynomial growth near boundaries.
Showed that the spaces of Hadamard type operators are topologically isomorphic to the strong dual of all C^∞ functions on multipliers holomorphic in the interior.
Proved the validity of the representation concerning uniform convergence on bounded sets.

Abstract

A representation in the form of a multiplicative convolution is obtained for Hadamard type operators on spaces of holomorphic functions on a bounded convex complex domain which have polynomial growth near the boundary of the domain or are infinitely differentiable up to the boundary. It is proved that the spaces of Hadamard type operators under consideration endowed with the topology of uniform convergence on bounded sets are topologically isomorphic to the strong dual of the space of all C^ functions on the corresponding set of multipliers holomorphic in its interior.

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Cite This Study

Ivanova et al. (Sun,) studied this question.

synapsesocial.com/papers/6a2ba29a8101cf8926f01913 https://doi.org/https://doi.org/10.1134/s0001434626600298

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