Boundary Behavior and Cesàro Means of Universal Taylor Series

  • Frédéric Bayart
DOI: https://doi.org/10.5209/rev_REMA.2006.v19.n1.16662
Keywords: Cluster set, universality, Overconvergence, Bernstein’s inequality

Abstract

We study boundary properties of universal Taylor series. We prove that if f is a universal Taylor series on the open unit disk, then there exists a residual subset G of the unit circle such that f is unbounded on all radii with endpoints in G. We also study the effect of summability methods on universal Taylor series. In particular, we show that a Taylor series is universal if and only if its Cesàro means are universal.

Downloads

Download data is not yet available.

Article download

Crossmark

Metrics

Published
2006-04-27
How to Cite
Bayart F. . (2006). Boundary Behavior and Cesàro Means of Universal Taylor Series. Revista Matemática Complutense, 19(1), 235-247. https://doi.org/10.5209/rev_REMA.2006.v19.n1.16662
Issue
Vol. 19 No. 1 (2006)
Section
Articles

License

LICENCE OF USE: The full text articles included on the Scientific Journals of the Complutense website are open access and the property of their authors and/or publishers. Therefore, any reproduction, distribution, public communication and/or total or partial transformation requires their express and written consent. Links to the full text of the articles on the Scientific Journals of the Complutense website should be to the official URL of the Complutense University of Madrid.