Uncertainty principles associated with the short time quaternion coupled fractional Fourier transform
Abstract
In this paper, we extend the coupled fractional Fourier transform of a complex valued functions to that of the quaternion valued functions on R4 and call it the quaternion coupled fractional Fourier transform (QCFrFT). We obtain the sharp Hausdorff-Young inequality for QCFrFT and obtain the associated R\`enyi uncertainty principle. We also define the short time quaternion coupled fractional Fourier transform (STQCFrFT) and explore its important properties followed by the Lieb's and entropy uncertainty principles.
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