Abstract
AbstractWe prove that any continuous function can be locally approximated at a fixed point
$x_{0}$
by an uncountable family resistant to disruptions by the family of continuous functions for which
$x_{0}$
is a fixed point. In that context, we also consider the property of quasicontinuity.
Publisher
Cambridge University Press (CUP)
Reference13 articles.
1. Dynamics of quasicontinuous systems
2. On the local aspects of distributional chaos;Loranty;Chaos,2019
3. Dynamics of Darboux functions;Pawlak;Tatra Mt. Math. Publ.,2009
4. Dynamical Systems Generated by Functions with Connected Gδ Graphs
5. On Points Focusing Entropy