# Is there a (standard) name for $\bar{A}\setminus A$?

This is a notation question:

If $A$ is a set in a topological space and $\bar{A}$ is its closure, is there a (standard) name for $\bar{A}\setminus A$?

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Though my subject is not topology but analysis, I have never seen a standard name for it. –  András Bátkai Jan 11 '13 at 8:41
I would think yours is in general an ill-behaved object. Of course, if your set is additionally open, then that's exactly the definition of boundary of $A$. –  Delio Mugnolo Jan 11 '13 at 9:08
How about "the set of limit points not in $A$" or "the set of closure points not in $A$"? These both sound familiar, and I can't immediately think of any other standard terminology. –  Mark Grant Jan 11 '13 at 9:20
you could call these points the: "external limit points" --- but why create new terminology unless you need to use it several times in the same paper... –  Suvrit Jan 11 '13 at 10:02
I had a series of papers in set-theoretic topology where sets of this form were critical to analyzing a notion of forcing, and I never came across a standard name... –  Todd Eisworth Jan 11 '13 at 15:32

You could use "external boundary"... and "internal boundary" for A minus its interior

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I don't think this is good terminology, because the intersection of the exterior of a set with its boundary will always be empty, and therefore needn't equal its external boundary. However the basic idea of modifying the word "boundary" with an adjective is a good one, in my opinion. –  user18921 Sep 24 '13 at 8:22

1) There seems not to be a standard notation/terminology for $\bar{A}\setminus A$ in the literature.

2) Points in $\bar{A}\setminus A$ can be referred to as "limit/closure points not in $A$" or "external limit/closure points".

3) $\bar{A}\setminus A$ is different in general than the boundary/frontier of $A$ which is defined as $\bar{A}\setminus \mathrm{int}(A)$, where $\mathrm{int}(A)$ is the interior of $A$.

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