The aim of this paper is to put the fundations of a new theory of functions, called holomorphic Cliffordian, which should play an essential role in the generalization of holomorphic functions to higher dimensions. Let R_{0,2m+1} be the Clifford algebra of R^{2m+1} with a quadratic form of negative signature, D = \sum_{j=0}^{2m+1} e_j {\partial\over \partial x_j} be the usual operator for monogenic functions and $\Delta$ the ordinary Laplacian. The holomorphic Cliffordian functions are functions f : \R^{2m+2} \fle \R_{0,2m+1}, which are solutions of D \Delta^m f = 0