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Convolution Theorems for Quaternion Fourier Transform: Properties and Applications

Mawardi BahriDepartment of Mathematics, Hasanuddin University, Makassar 90245, IndonesiaRyuichi AshinoDivision of Mathematical Sciences, Osaka Kyoiku University, Osaka 582-8582, JapanRémi VaillancourtDepartment of Mathematics and Statistics, University of Ottawa, Ottawa, ON, Canada K1N 6N5
2013en
ABI

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General convolution theorems for two-dimensional quaternion Fourier transforms (QFTs) are presented. It is shown that these theorems are valid not only for real-valued functions but also for quaternion-valued functions. We describe some useful properties of generalized convolutions and compare them with the convolution theorems of the classical Fourier transform. We finally apply the obtained results to study hypoellipticity and to solve the heat equation in quaternion algebra framework.

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