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ervx
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Is a Finite Increasing Chain of Closed Sets the Closure of the Union of the Interiors of the Relative Complements?

Let $X$ be a topological space. Suppose there are closed subsets $X=:F_{k}\supseteq F_{k-1}\supseteq\cdots\supseteq F_{1}\supseteq F_{0}:=\emptyset$. Is it true that

$\overline{\bigcup_{j=1}^{k}\operatorname{Int}(F_{j}\setminus F_{j-1})}=X$?

If $k=1$, the result is trivial. For $k>1$, we have $$ \overline{\bigcup_{j=1}^{k}\operatorname{Int}(F_{j}\setminus F_{j-1})}=\overline{\operatorname{Int}(X\setminus F_{k-1})}\cup\overline{\bigcup_{j=1}^{k-1}\operatorname{Int}(F_{j}\setminus F_{j-1})}=\overline{X\setminus F_{k-1}}\cup\overline{\bigcup_{j=1}^{k-1}\operatorname{Int}(F_{j}\setminus F_{j-1})}. $$

When $k=2$, the RHS simplifies to $$ \overline{X\setminus F_{1}}\cup\overline{\operatorname{Int}(F_{1})}=\overline{X\setminus\operatorname{bd}(F_{1})}=X. $$

I'm not sure if it's possible to carry out a similar reduction when $k>2$; or, if this result is indeed true. Any help is appreciated.

Thank you.

ervx
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