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<rdf:RDF xmlns:rdf="http://www.w3.org/1999/02/22-rdf-syntax-ns#" xmlns:dc="http://purl.org/dc/elements/1.1/"><rdf:Description rdf:about="https://dirros.openscience.si/IzpisGradiva.php?id=18648"><dc:title>On a definition of logarithm of quaternionic functions</dc:title><dc:creator>Gentili,	Graziano	(Avtor)
	</dc:creator><dc:creator>Prezelj,	Jasna	(Avtor)
	</dc:creator><dc:creator>Vlacci,	Fabio	(Avtor)
	</dc:creator><dc:subject>regular functions over quaternions</dc:subject><dc:subject>quaternionic logarithm of slice-regular functions</dc:subject><dc:description>For a slice-regular quaternionic function $f$, the classical exponential function ${\mathrm exp} f$ is not slice-regular in general. An alternative definition of an exponential function, the $\ast$-exponential ${\mathrm exp}_\ast$, was given in the work by Altavilla and de Fabritiis (2019): if $f$ is a slice-regular function, then ${\mathrm exp}_\ast f$ is a slice-regular function as well. The study of a $\ast$-logarithm ${\mathrm log}_\ast f$ of a slice-regular function $f$ becomes of great interest for basic reasons, and is performed in this paper. The main result shows that the existence of such a ${\mathrm log}_\ast f$ depends only on the structure of the zero set of the vectorial part $f_v$ of the slice-regular function $f = f_0 + f_v$, besides the topology of its domain of definition. We also show that, locally, every slice-regular nonvanishing function has a $\ast$-logarithm and, at the end, we present an example of a nonvanishing slice-regular function on a ball which does not admit a $\ast$-logarithm on that ball.</dc:description><dc:date>2023</dc:date><dc:date>2024-04-10 08:26:19</dc:date><dc:type>Neznano</dc:type><dc:identifier>18648</dc:identifier><dc:language>sl</dc:language></rdf:Description></rdf:RDF>