On stronger forms of Devaney chaos
Abstract
We define and study stronger forms of Devaney chaos and name it as F-Devaney chaos, where F is a family of subsets of N. Examples of maps which is Ft-Devaney chaotic but not Fcf-Devaney chaotic, Fs-Devaney chaotic but neither Ft-Devaney chaotic nor Fcf-Devaney chaotic are discussed. Further, we show that for the maps on infinite metric space without isolated points, F-sensitivity is a redundant condition in the definition F-Devaney chaos. Here F=Fs, \: Ft, \: Fts or Fcf. We also obtain conditions under which Devaney chaos implies Fs-Devaney chaos or Ft-Devaney chaos. Next, we define the concept of (F, G)-P-chaos and obtain conditions under which (F1, G1)-P-chaos implies F-Devaney chaos for different families F1 and G1.
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