The narrow border between a continuous function and a discontinuous function
DOI: 193 Downloads 5722 Views
Author(s)
Abstract
The RAFU functions have been studied in [1, 2, 3, 4, 5 and 6]. They are useful in Approximation Theory to approach continuous functions and to reconstruct continuous functions. In this work we will use the RAFU functions to turn a discontinuous function into a continuous function. We will show the explicit expression of a sequence of continuous functions that converges to a discontinuous function given except at its discontinuity points. The paper shows examples for different types of discontinuities.
Keywords
RAFU functions; continuous functions; discontinuous functions.
Cite this paper
Alicia C. Sánchez,
The narrow border between a continuous function and a discontinuous function
, SCIREA Journal of Mathematics.
Volume 5, Issue 3, June 2020 | PP. 32-43.
References
[ 1 ] | E. Corbacho. Uniform approximation with radical functions. SeEMA Journal 58 (1). 97-122. April 2012. |
[ 2 ] | E. Corbacho. A RAFU linear space uniformly dense in C[a, b]. Applied General Topology 14 (1). 53-60. 2013. |
[ 3 ] | E. Corbacho. The RAFU method on approximation. LAP Lambert Academic Publishing. 2015. |
[ 4 ] | E. Corbacho. Approximation in different smoothness spaces with the RAFU method. Applied General Topology 15 (2). 221--228. 2014 |
[ 5 ] | E. Corbacho. Simultaneous approximation with the RAFU method. Journal of Mathematical Inequalities 10 (1). 219-231. 2016 |
[ 6 ] | E Corbacho. Uniform reconstruction of continuous functions with the RAFU method. Applied General Topology 18 (2). 361-375. 2017. |