English

Boundary interpolation for slice hyperholomorphic Schur functions

Complex Variables 2014-05-27 v2 Functional Analysis

Abstract

A boundary Nevanlinna-Pick interpolation problem is posed and solved in the quaternionic setting. Given nonnegative real numbers κ1,,κN\kappa_1, \ldots, \kappa_N, quaternions p1,,pNp_1, \ldots, p_N all of modulus 11, so that the 22-spheres determined by each point do not intersect and pu1p_u \neq 1 for u=1,,Nu = 1,\ldots, N, and quaternions s1,,sNs_1, \ldots, s_N, we wish to find a slice hyperholomorphic Schur function ss so that limr1r(0,1)s(rpu)=suforu=1,,N,\lim_{\substack{r\rightarrow 1\\ r\in(0,1)}} s(r p_u) = s_u\quad {\rm for} \quad u=1,\ldots, N, and limr1r(0,1)1s(rpu)su1rκu,foru=1,,N.\lim_{\substack{r\rightarrow 1\\ r\in(0,1)}}\frac{1-s(rp_u)\overline{s_u}}{1-r}\le\kappa_u,\quad {\rm for} \quad u=1,\ldots, N. Our arguments relies on the theory of slice hyperholomorphic functions and reproducing kernel Hilbert spaces.

Keywords

Cite

@article{arxiv.1404.3352,
  title  = {Boundary interpolation for slice hyperholomorphic Schur functions},
  author = {K. Abu-Ghanem and D. Alpay and F. Colombo and D. P. Kimsey and I. Sabadini},
  journal= {arXiv preprint arXiv:1404.3352},
  year   = {2014}
}
R2 v1 2026-06-22T03:49:31.229Z