On the Clifford-Fourier transform

Abstract

For functions that take values in the Clifford algebra, we study the Clifford-Fourier transform on Rm defined with a kernel function K(x,y) := ei π2 ye-i <x,y>, replacing the kernel ei <x,y> of the ordinary Fourier transform, where y := - Σj<k ejek (yj ∂yk - yk∂yj). An explicit formula of K(x,y) is derived, which can be further simplified to a finite sum of Bessel functions when m is even. The closed formula of the kernel allows us to study the Clifford-Fourier transform and prove the inversion formula, for which a generalized translation operator and a convolution are defined and used.