Lagrange polynomials over Clifford numbers

Abstract

We construct Lagrange interpolating polynomials for a set of points and values belonging to the algebra of real quaternions H R0,2, or to the real Clifford algebra R0,3. In the quaternionic case, the approach by means of Lagrange polynomials is new, and gives a complete solution of the interpolation problem. In the case of R0,3, such a problem is dealt with here for the first time. Elements of the recent theory of slice regular functions are used. Leaving apart the classical cases R0,0 R, R0,1 C and the trivial case R1,0 R R, the interpolation problem on Clifford algebras Rp,q with (p,q)≠(0,2),(0,3) seems to have some intrinsic difficulties.