摘要
The main purpose of this paper is to study different types of sampling formulas of quaternionic functions,which are bandlimited under various quaternion Fourier and linear canonical transforms.We show that the quaternionic bandlimited functions can be reconstructed from their samples as well as the samples of their derivatives and Hilbert transforms.In addition,the relationships among different types of sampling formulas under various transforms are discussed.First,if the quaternionic function is bandlimited to a rectangle that is symmetric about the origin,then the sampling formulas under various quaternion Fourier transforms are identical.If this rectangle is not symmetric about the origin,then the sampling formulas under various quaternion Fourier transforms are different from each other.Second,using the relationship between the two-sided quaternion Fourier transform and the linear canonical transform,we derive sampling formulas under various quaternion linear canonical transforms.Third,truncation errors of these sampling formulas are estimated.Finally,some simulations are provided to show how the sampling formulas can be used in applications.
基金
the Research Development Foundation of Wenzhou Medical University
China(No.QTJ18012)
the Wenzhou Science and Technology Bureau of China(No.G2020031)
the Guangdong Basic and Applied Basic Research Foundation of China(No.2019A1515111185)
the Science and Technology Development Fund
Macao Special Administrative Region
China(No.FDCT/085/2018/A2)
the University of Macao
China(No.MYRG2019-00039-FST)。
