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1999/2000 Every Almost Continuous Funciton is Polygonally Almost Continuous
Piotr Szuca
Real Anal. Exchange 25(2): 691-694 (1999/2000).

Abstract

We show that every almost continuous function $f\colon\mathbb{I}\to\mathbb{R}$ is also polygonally almost continuous. This solves a problem posed by Agronski, Ceder and Pearson (see [ACP])

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Piotr Szuca. "Every Almost Continuous Funciton is Polygonally Almost Continuous." Real Anal. Exchange 25 (2) 691 - 694, 1999/2000.

Information

Published: 1999/2000
First available in Project Euclid: 3 January 2009

zbMATH: 1035.26005
MathSciNet: MR1778522

Subjects:
Primary: 26A15

Keywords: almost continuous functions , Darboux functions , polygonal functions , polygonally almost continuous functions

Rights: Copyright © 1999 Michigan State University Press

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Vol.25 • No. 2 • 1999/2000
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