Some holomorphic generalizations of loxodromic functions
Abstract
The functional equation of the form $f(qz) = p(z)f(z), z \in C\setminus \{ 0\} , q \in C\setminus \{ 0\} , | q| < 1$ is considered. For certain fixed elementary functions $p(z)$, holomorphic solutions of this equation are found. These solutions are some generalizations of loxodromic functions. Some of solutions are represented via the Schottky – Klein prime function.
Citation Example: Lukivska Dz. V. Some holomorphic generalizations of loxodromic functions // Ukr. Mat. Zh. - 2017. - 69, № 9. - pp. 1284-1288.
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