User:Zfeinst/Closure of Sum of Closed Sets

If ${\displaystyle A,B\subseteq X}$ are closed sets in a topological vector space then ${\displaystyle A+B}$ is closed if

1. Either ${\displaystyle A}$ or ${\displaystyle B}$ is compact set
2. Dieudonne's theorem: Let nonempty closed convex sets ${\displaystyle A,B\subset X}$ a locally convex space, if either ${\displaystyle A}$ or ${\displaystyle B}$ is locally compact and ${\displaystyle \operatorname {recc} (A)\cap \operatorname {recc} (B)}$ (where ${\displaystyle \operatorname {recc} }$ gives the recession cone) is a linear subspace, then ${\displaystyle A-B}$ is closed.^[1][2]
3. Let nonempty closed convex sets ${\displaystyle A,B\subset \mathbb {R} ^{d}}$ such that for any ${\displaystyle y\in \operatorname {recc} (A)\backslash \{0\}}$ then ${\displaystyle -y\not \in \operatorname {recc} (B)}$, then ${\displaystyle A+B}$ is closed.^[3][4]
4. Let nonempty closed convex sets ${\displaystyle A,B\subset X}$ a reflexive Banach space contain no lines, if ${\displaystyle \lim _{r\to \infty }\inf\{\|a-b\|:a\in A\backslash {\mathcal {B}}(r),b\in B\backslash {\mathcal {B}}(r)\}=\infty }$ then ${\displaystyle A-B}$ is closed (where ${\displaystyle {\mathcal {B}}(r)=\{x\in X:\|x\|\leq r\}}$). In fact, if this condition is satisfied then any two closed convex uniform perturbations ${\displaystyle A_{\epsilon }}$ and ${\displaystyle B_{\epsilon }}$ fulfilling ${\displaystyle A_{\epsilon }\subseteq A+{\mathcal {B}}(\epsilon ),\;A\subseteq A_{\epsilon }+{\mathcal {B}}(\epsilon )}$ and ${\displaystyle B_{\epsilon }\subseteq B+{\mathcal {B}}(\epsilon ),\;B\subseteq B_{\epsilon }+{\mathcal {B}}(\epsilon )}$ then ${\displaystyle A_{\epsilon }-B_{\epsilon }}$ is closed.^[5]
5. ...

References

1. J. Dieudonné (1966). "Sur la séparation des ensembles convexes". Math. Ann.. 163.
2. Zălinescu, Constantin (2002). Convex analysis in general vector spaces. River Edge, NJ: World Scientific Publishing Co., Inc. pp. 6–7. ISBN 981-238-067-1. MR 1921556.
3. Rockafellar, R. Tyrrell (1997) [1970]. Convex Analysis. Princeton, NJ: Princeton University Press. pp. 60–76. ISBN 978-0-691-01586-6.
4. Kim C. Border. "Sums of sets, etc" (pdf). Retrieved March 7, 2012.
5. Adly, Samir; Ernst, Emil; Théra, Michel (2003). "On the closedness of the algrebraic difference of closed convex sets". J. Math. Pures Appl.. 82 (9): 1219–1249.