Special Functions of Hypercomplex Variable on the Lattice Based on SU(1,1)

Abstract

Based on the representation of a set of canonical operators on the lattice hZn, which are Clifford-vector-valued, we will introduce new families of special functions of hypercomplex variable possessing su(1,1) symmetries. The Fourier decomposition of the space of Clifford-vector-valued polynomials with respect to the SO(n)× su(1,1)-module gives rise to the construction of new families of polynomial sequences as eigenfunctions of a coupled system involving forward/backward discretizations Eh of the Euler operator E=Σj=1nxj ∂xj. Moreover, the interpretation of the one-parameter representation Eh(t)=(tEh--tEh+) of the Lie group SU(1,1) as a semigroup (Eh(t))t≥ 0 will allows us to describe the polynomial solutions of an homogeneous Cauchy problem on [0,∞)× h Zn involving the differencial-difference operator ∂t+Eh+-Eh-.