TY - JOUR
T1 - Some Chaotic Properties of G- periodic Shadowing Property
JF - JCR
JO - Journal of Critical Reviews
SP - 167
LP - 170
M3 - 10.22159/jcr.07.01.29
VL - 7
IS - 1
AU - Raad Safah Abood AL – Juboory
AU - Iftichar M. T. AL - Shara’a
Y1 - 2020
UR - http://www.jcreview.com/?mno=302645221
N2 - Let (M,ɗ ) be a metric G-space and ɸ ∶M→M be a continuous map. This paper aims to study the idea of the G-periodic shadowing property (G Per.SP ) for a continuous map on G-space and achieves the relative of the G Per.SP with G-shadowing property (G SP). Also, if ɸ has the G Per.SP, then ɸ^n has the G Per.SP for every n∈N. We show that if ɸ is a G –expansive and has the G SP then ɸ has the G Per.SP, and if the map ɸ on compact metric G-space has G-chain transitive and the G Per.SP, then ɸ has the G SP with G-transitivity. We show that the map ɸ on compact metric G-space, ɸ is a G–expansive and G-chain mixing, if ɸ^n has G Per.SP for some n∈N,such that n≠1 then ɸ has G Per.SP. Moreover, we prove that if a map ɸ be pseudo-equivariant with dense set of G_ɸ-periodic points which has the G Per.SP and G-average shadowing property(GASP) then ɸ is G-chain mixing. Finally, we show that if (M,ɗ ) is a compact metric G-space having two points at least, ɸ be a G-distal homeomorphism and ɸ is G-chain mixing , then ɸ does not have the G Per.SP.
ER -