Abstract: Let
be
a k-Warsaw circle and f be a
continuous map from into
itself. It is shown that if then
f is equicontinuous if and only if where
denotes
the minimal common multiple of And
that if then
f is equicontinuous if and only if one of the two conditions holds:
(1)
(2)
Keywords and phrases: k-Warsaw circle, pointwise recurrent, equicontinuity.
