Functional Equation with Holomorphic Coefficients Related to a Finite Group

Let D be a semicircle, which is the fundamental domain of a finite properly discontinuous group of linear-fractional transformations. We consider a linear four-element functional equation with holomorphic coefficients in D that is generated by this group. The solution is sought in the class of funct...

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Bibliographic Details
Published in:Russian mathematics 2022-08, Vol.66 (8), p.27-30
Main Authors: Garif’yanov, F. N., Strezhneva, E. V.
Format: Article
Language:English
Subjects:
Entire functions
Fixed points (mathematics)
Functional equations
Group theory
Mathematical analysis
Mathematics
Mathematics and Statistics
Regularization
Transformations (mathematics)
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Summary:Let D be a semicircle, which is the fundamental domain of a finite properly discontinuous group of linear-fractional transformations. We consider a linear four-element functional equation with holomorphic coefficients in D that is generated by this group. The solution is sought in the class of functions that are holomorphic outside “half” the boundary ∂ D and vanishing at infinity. To regularize the equation, we introduce a Carleman involutive shift induced by the generating transformations of the group. This shift has two fixed points. The condition for regularization equivalence is found. Applications to the problem of moments for entire functions of exponential type are specified.
ISSN:1066-369X
1934-810X
DOI:10.3103/S1066369X22080035