Pointwise attractors which are not strict
Abstract
We deal with the finite family F of continuous maps on the Hausdorff space. A nonempty compact subset A of such space is called a strict attractor if it has an open neighborhood U such that A=n∞Fn(S) for every nonempty compact S⊂ U. Every strict attractor is a pointwise attractor, which means that the set \x∈ X ; n∞Fn(x)=A\ contains A in its interior. We present a class of examples of pointwise attractors - from the finite set to the Sierpi\'nski carpet - which are not strict when we add to the system one nonexpansive map.
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