On a sequence of monogenic polynomials satisfying the Appell condition whose first term is a non-constant function

Abstract

In this paper we aim at constructing a sequence \Mnk(x)\n0 of R0,m-valued polynomials which are monogenic in Rm+1 satisfying the Appell condition (i.e. the hypercomplex derivative of each polynomial in the sequence equals, up to a multiplicative constant, its preceding term) but whose first term M0k(x)=Pk( x) is a R0,m-valued homogeneous monogenic polynomial in Rm of degree k and not a constant like in the classical case. The connection of this sequence with the so-called Fueter's theorem will also be discussed.