Abstract
Fueter’s Theorem offers a method that conveys certain holomorphic functions in one complex variable to quaternionic regular (monogenic) functions. Ever since the theorem was proved in 1935, it underwent several main generalizations. Those are not only based on its own interest, but also motivated by applications found in other areas of mathematics, such as functional calculus of operators. This article serves as a survey on Fueter’s Theorem, its generalizations and applications.
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Acknowledgements
The author wishes to sincerely thank I. Sabadini, F. Colombo, and D. Peña Peña for helpful information and remarks on the subject which greatly contribute to the writing out of this essay.
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Qian, T. (2014). Fueter Mapping Theorem in Hypercomplex Analysis. In: Alpay, D. (eds) Operator Theory. Springer, Basel. https://doi.org/10.1007/978-3-0348-0692-3_28-1
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DOI: https://doi.org/10.1007/978-3-0348-0692-3_28-1
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