Original Articles

APPROXIMATION BY VECTOR-VALUED FUNCTIONS

Published in: Quaestiones Mathematicae
Volume 4 , issue 3 , 1981 , pages: 159–165

DOI: 10.1080/16073606.1981.9631869

Author(s): M. Brannigan ,

Keywords: 4140 , 4155

Abstract

The theory of H-sets was first propounded by L. Collatz [3] and [4]. This concept has been shown to be useful in the study of uniform approximation, and we here consider the form H-sets take in this setting of vector-valued functions and prove a general characterization theorem. A similar exposition for the linear real-valued case can be found in [1].

« EDITORIAL BOARD / REDAKSIERAAD

CONTINUOUS DEPENDENCE OF THE SOLUTIONS OF ELUPTIC BWNOARY VALUE PROBLEMS ON THE COEFFICIENTS, RIGHT HAND SIDES AND BOUNDARY CONDITIONS »