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Uniqueness Classes for Difference Functionals

Published online by Cambridge University Press:  20 November 2018

Richard F. DeMar*
Affiliation:
Miami University, Oxford, Ohio and University of California, Davis
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If ﹛Ln is a sequence of linear functionals on a linear space C of functions to the complex numbers, then a subspace C1C is a uniqueness class for ﹛Ln if a function f in C1 is uniquely determined by the sequence ﹛Ln(f)﹜ of complex numbers; i.e., if fC1 and Ln(f) = 0, n = 0, 1, 2, … , implies f = 0. For example, the class of all functions f analytic at the origin is a uniqueness class for the sequence ﹛f(n)(0)﹜ of linear functionals. Gontcharoff (9) asked the following question: Suppose, instead of ﹛f(n)(0)﹜, we use ﹛f(n)(an)﹜.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1966

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