Firstly, the new concepts of
G
−
expansibility,
G
−
almost periodic point, and
G
−
limit shadowing property were introduced according to the concepts of expansibility, almost periodic point, and limit shadowing property in this paper. Secondly, we studied their dynamical relationship between the self-map
f
and the shift map
σ
in the inverse limit space under topological group action. The following new results are obtained. Let
X
,
d
be a metric
G
−
space and
X
f
,
G
¯
,
d
¯
,
σ
be the inverse limit space of
X
,
G
,
d
,
f
. (1) If the map
f
:
X
⟶
X
is an equivalent map, then we have
A
P
G
¯
σ
=
Lim
←
A
p
G
f
,
f
. (2) If the map
f
:
X
⟶
X
is an equivalent surjection, then the self-map
f
is
G
−
expansive if and only if the shift map
σ
is
G
¯
−
expansive. (3) If the map
f
:
X
⟶
X
is an equivalent surjection, then the self-map
f
has
G
−
limit shadowing property if and only if the shift map
σ
has
G
¯
−
limit shadowing property. The conclusions of this paper generalize the corresponding results given in the study by Li, Niu, and Liang and Li . Most importantly, it provided the theoretical basis and scientific foundation for the application of tracking property in computational mathematics and biological mathematics.
Product Anosov diffeomorphisms and the two-sided limit shadowing property
