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E17

[0PJ] Topics:interior.Prerequisites:[0P3],[0PD].

Given \(X\) metric space and \(A⊆ X\), show that

\[ {{A}^\circ } = {{\left({{A}^\circ }\right)}^\circ }~ ~ , \]

using the above definitions.

For what has been said in [0PB], this is equivalent to saying that \({{A}^\circ }\) is an open set.

(For the case of \(X\) topological space, see the [0GF])

Solution 1

[0PK]

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Bibliography
Book index
  • accumulation point, in metric spaces
  • topology, in metric spaces
  • interior
  • metric space
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