Boundary interpolation for slice hyperholomorphic Schur functions

Abstract

A boundary Nevanlinna-Pick interpolation problem is posed and solved in the quaternionic setting. Given nonnegative real numbers 1, …, N, quaternions p1, …, pN all of modulus 1, so that the 2-spheres determined by each point do not intersect and pu ≠ 1 for u = 1,…, N, and quaternions s1, …, sN, we wish to find a slice hyperholomorphic Schur function s so that r→ 1\\ r∈(0,1) s(r pu) = su for u=1,…, N, and r→ 1\\ r∈(0,1)1-s(rpu)su1-ru, for u=1,…, N. Our arguments relies on the theory of slice hyperholomorphic functions and reproducing kernel Hilbert spaces.