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Questions tagged [compactness]

The compactness tag is for questions about compactness and its many variants (e.g. sequential compactness, countable compactness) as well locally compact spaces; compactifications (e.g. one-point, Stone-Čech) and other topics closely related to compactness. This includes logical compactness.

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Why can't I immerse the unit interval $[0, 1]$ in the 1-torus $T^1$?

I'm supposed to prove that I can't smoothly immerse a compact, simply connected and smooth 1-manifold into $S^1 = T^1$, the 1-torus. I don't understand why I can't do this: take my simply connected 1-...
Nate's user avatar
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Uniformly equicontinuous

Let $X$ and $Y$ be metric space and $a \in X$. A family $A$ of functions from $X$ to $Y$ is said to be equicontinuous at $a$ if for any $\epsilon >0$ there exists a $\delta >0$ such that $d(x,a)&...
Texas's user avatar
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1 answer
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Is the embedding $X_T := \mathbf{H}(\text{curl}) \cap \mathbf{H}_0(\text{div}^0) \rightarrow \mathbf{H}_0(\text{div}^0) $ compact?

I am currently studying embeddings in Sobolev spaces related to computational electromagnetics, and I came across a problem that I'm not entirely sure about. Specifically, I am interested in the ...
Robert's user avatar
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0 answers
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$A$ and $B$ is compact space of normed vector space then $A+B$ is compact. [duplicate]

If $A$ and $B$ are compact subset of a normed vector space then $A+ B$ is also compact space, right? Because since $A\times B$ is compact and $f:A\times B \rightarrow A+B$ such that $f(a,b) = a +b $ ...
Texas's user avatar
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2 votes
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Finite Boolean combinations of rational intervals, as a subspace of $\{0,1\}^{\mathbb{R}}$: is it $C^*$-embedded?

Setup: Consider $X = \lbrace 0,1\rbrace ^{\mathbb{R}}$ with the product topology, which we might freely identify with the powerset of $\mathbb{R}$ through characteristic functions. Let $D \subseteq X$ ...
Gro-Tsen's user avatar
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Does the Space of Functions have a Compact Covering?

Let $X$ be an arbitrary set and $\mathbb{R}^X$ denote the set of real valued functions on $X$. Define the metric $$d(f,g) = \sum_{i=1}^\infty \frac{i \wedge \sup_{x \in X} |f(x) - g(x)|}{2^i}$$ on $\...
qp212223's user avatar
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1 vote
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Proof regarding the equivalence of norms, compactness and completeness of normed vector spaces of finite dimension

I wrote a proof regarding the important properties of normed vector spaces that are of finite dimension. I would like to know if I've made mistakes of any sort. I'm open to any critique. $\mathbb{K}$ ...
Ceru's user avatar
  • 95
3 votes
2 answers
120 views

Locally Lipschitz with respect to a variable uniformly to another implies Lipschitz for every compact subset

I was reading a proof of Picard-Lindelöf theorem and there is a step in the proof which needs the following proposition, which I have not been able to prove. Let $$f:A\subset{\mathbb{R}^{n+1}}\to{\...
zinne98's user avatar
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1 answer
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Can ordinal spaces be Dowker spaces?

Can an ordinal space be Dowker? My guess is no; however, I don't have a proof. Here is my progress: I know Dowker spaces are not countably paracompact. It seems that if the ordinal $\alpha$ is a ...
Lucenaposition's user avatar
4 votes
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Is $\Gamma \vDash B$ in propositional logic a r.e. problem?

One version of the compactness theorem in propositional logic is as follows: if $\Gamma \vDash B$, then there is a finite $\Delta \subseteq \Gamma$ s.t. $\Delta \vDash B$. However, this by itself does ...
3-3_0-5_5-0_1-1's user avatar
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2 answers
88 views

Why do we need step 4. in this proof of the compactness of $[0, 1]$?

In this proof of the compactness of $[0, 1]$ provided in this question I am understanding proof of theorem stated in title from Spivak's calculus. It is as below. (0) Let $\mathcal{O}$ be an open ...
Waleed Dahshan's user avatar
1 vote
1 answer
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Jacod and Protters Proof of characteristic uniqueness of functions, extending from compact to infinity.

I want to fill in the details in Jacod and Protter's proof of the uniqueness of characteristic functions. The problem is that we have something that works for a compact set, and I want it to work for ...
user394334's user avatar
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Limits of sequences of nonlinear "bounded" operators

I have a sequence of nonlinear operators $T_n\colon X \to Y$ between two separable Hilbert spaces. The operators are bounded uniformly in that there is a constant $C$ with $$|T_n(x)| \leq C|x|.$$ I ...
C_Al's user avatar
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5 votes
1 answer
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Understanding the witness property in the Henkin construction

I'm trying to get a really good intuition for why the proof of the compactness theorem via the Henkin construction in Marker's model theory uses the witness property, specifically, why use For every ...
TomKern's user avatar
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What is the map of the Stone-Čech compactification of the rationals to that of the reals like?

This is a kind of followup question to this old one. Let $\mathbb{Q}$ and $\mathbb{R}$ have their usual (Euclidean) topology, and let $\beta\mathbb{Q}$ and $\beta\mathbb{R}$ stand for their respective ...
Gro-Tsen's user avatar
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Do additional boundary conditions affect the compact embedding of Sobolev spaces?

Suppose $\Omega \subset \mathbb{R}^2$ open bounded and sufficiently smooth with outward unit normal $\mathbf{n}$. It is known by the Rellich-Kondrachov theorem that $$ H^2(\Omega) \hookrightarrow H^1(\...
Thede's user avatar
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1 answer
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Quasicompactness of $\operatorname{Proj}A$

$\newcommand{\Proj}{\operatorname{Proj}}$ Let $A$ be a graded ring of the form: \begin{align} A=\bigoplus_{n=0}^\infty A_n \end{align} So in particular this ring is positively graded, but it is not ...
Chris's user avatar
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2 votes
1 answer
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If $(X,\tau)$ is compact and $\mathcal{F}\subset C(X)$ is separating points, then the weak topology generated by $\mathcal{F}$ is equal to $\tau$

Let $\left(X,\tau\right)$ be a compact topological space, and let $\mathcal{F}\subset C(X)$ such that $\forall x\neq y\in X,\exists f\in\mathcal{F}:f(x)\neq f(y)$. Then the weak topology generated by $...
Staltus's user avatar
  • 377
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1 answer
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Heine-Borel for Finite Dimensional Normed Vector Spaces

I would like to show that finite-dimensional normed vector spaces have the Heine-Borel property (any subset is compact if and only if it is closed and bounded). I have decided to take the following ...
Tread Carefully's user avatar
2 votes
0 answers
26 views

Compactness criterion in the Skorokhod space $\mathbb D([0,T],E)$ with separable $E$

For a metric space $(E,d)$, we define the Skorokhod space $\mathbb D([0,T],E)$ as being the set of all functions from $[0,T]$ to $E$ which are right-continuous and with left limits. In the case where $...
maxjw91's user avatar
  • 516
1 vote
1 answer
73 views

Consequence of Banach Alaoglu Theorem

The Banach Alaoglu theorem states: Let $\mathcal{Z}$ be a banach space. The closed unit ball $\{Z^{\ast}\in\mathcal{Z}^{\ast}:\|Z^{\ast}\|_{\ast}\leq1\}$ is compact in the weak$\ast$ topology of $\...
guest1's user avatar
  • 537
2 votes
1 answer
88 views

Pointwise convergence of almost periodic function

This question is inspired by this post and definitions I use can be found there. The definition of $C_0(\mathbb{R})$ can be found in this wiki: Fix $f$ a real-valued almost periodic (but not periodic) ...
Sanae's user avatar
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2 votes
1 answer
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If $\{K_n\}_n$ is a family of compacts such that $\bigcap_nK_n=\varnothing$, then $\exists N\in\mathbb{N}$ such that $\bigcap_{i\le N}K_i=\varnothing$

I was reading Bogachev's Measure Theory book, when I stumbled upon this part: The specification "more generally, in a topological space" made me wonder if the same result can be proved for ...
Luigi Traino's user avatar
5 votes
1 answer
249 views

Isometry into the Hilbert cube

Let $(X,d)$ be a compact metric space. Does there exist a metric $d'$ on the Hilbert cube $H = [0, 1]^\mathbb{N}$, compatible with its topology, such that $(X,d)\hookrightarrow (H,d')$ is an isometric ...
monoidaltransform's user avatar
2 votes
1 answer
101 views

Weak* compactness of subset of $L^q$

Let $\mathcal{Z}=L^p(\Omega, \mathcal{A}, \mu)$ and its dual space $\mathcal{Z}^*=L^q(\Omega, \mathcal{A}, \mu)$. Let $$\langle Z, Z^*\rangle = \int Z \, Z^* d\mu$$ be their dual paar. EDIT: Let $c:\...
guest1's user avatar
  • 537
2 votes
1 answer
23 views

What fields generate compact projective spaces?

Given a field $k$, one can generate the vector space $k^n$ and topologize it with the product topology. Then one can delete the 0 element and quotient the remaining set ($k^n \setminus \{0\}$) by the ...
Dale's user avatar
  • 295
1 vote
0 answers
152 views

Compactness of set of all measurable functions

Let $X$ be compact subset of $\mathbb{R}^n$ and let $Y$ be compact subset of $\mathbb{R}^p$. Consider $\mathcal{F}$ the set of all measurable functions from $X$ to $Y$. Can I find topologies under ...
guest1's user avatar
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0 votes
0 answers
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Showing One-point compactification topology on $\mathbb R^n$ is Compact without using Stereographic Projection map. [duplicate]

The following is a well known result from point-set topology: Theorem: Suppose $\mathbb R^n$ is the Euclidean-$n$-space and $\infty$ be a symbol not contained in $\mathbb R^n$(By Russel's Paradox)....
Kishalay Sarkar's user avatar
1 vote
0 answers
27 views

Proving $\sigma$-compactness of Pontryagin dual

I am reading A First Course in Harmonic Analysis(2nd ed.) by Anton Deitmar. In Theorem 7.1.4, the author proves that the dual group $\hat{A}$ of a LCA group $A$ is also an LCA group. I am stuck with ...
김서연's user avatar
2 votes
1 answer
47 views

Is there a continuous bijective mapping of $R$ into a compactum

I wonder if there are generally no bijective, continuous mappings of the form $$f: \mathbb{R} \rightarrow K$$ if $K$ is a topological compact space.$$$$ My considerations I realize that the inverse ...
Noctis's user avatar
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5 votes
0 answers
58 views

When must a space generated by compacts also be generated by Hausdorff compacts?

Cross-posted to MathOverflow: https://mathoverflow.net/questions/475934/. I'm interested in comparing $k_1$-spaces, spaces whose topologies are witnessed by their compact subspaces, and $k_3$-spaces, ...
Steven Clontz's user avatar
0 votes
0 answers
56 views

For compact Hausdorff spaces, is countable pseudocharacter equivalent to first countable? [duplicate]

Let $X$ be a compact $T_2$ space. Is $X$ first countable if, and only if, $X$ has countable pseudocharacter? Note: I have already proven that every $T_1$ first countable space has countable ...
Almanzoris's user avatar
1 vote
0 answers
67 views

Rudin's RCA 2.24 theorem : Lusin's theorem

As precised in the title of my question, the context is the book of Walter Rudin : Real and Complex analysis. And especially the proof of theorem 2.24 (Lusin's theorem) which I put below. I have a ...
Laurent Garnier's user avatar
3 votes
1 answer
74 views

Must scattered spaces with points $G_\delta$ be locally countable?

By M. E. Gewand, “The Lindelöf degree of scattered spaces and their products,” Journal of the Australian Mathematical Society (Series A) 37 (1984), 98–105, we have: Theorem. Every Lindelöf scattered $...
Steven Clontz's user avatar
2 votes
0 answers
68 views

Bochner-Sobolev spaces with second time derivative and embeddings

In the weak theory of evolution PDEs, the Bochner-Sobolev spaces are frequently used. For $a,b \in \mathbb{R}$ and $X,Y$ banach spaces, we define these spaces as $$W^{1,p,q}(a,b,X,Y) = \left\{v, \ \...
Maths_GEES 's user avatar
2 votes
2 answers
50 views

Is there a maximum number of disjoint balls of fixed radius I can fit into a compact metric space?

Let $(X,d)$ be a compact metric space and fix $r>0$. By sequential compactness, one may not find an infinite number of disjoint $r$-balls (sets $B_r(x):=\{y \in X: d(x,y)<r\}$) in $X$ as this ...
Qiyu Xie's user avatar
1 vote
0 answers
52 views

Find compactification of $\mathbb{R}$ which has a subset homeomorphic to $\mathbb{R}^2$

Consider $X=\mathbb{R}$ with the standard topology. How can I find a compactification $Y$, such that $Y$ is (of course) compact, hausdorff and has a subset which is homeomorphic to $\mathbb{R}^2$? ...
FreeZe's user avatar
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1 vote
0 answers
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Locally compact Hausdorff covering space

I am trying to prove the following conjecture: Let $\pi : E\to B$ be a covering map. If $E$ is locally compact Hausdorff, then so is $B$. (The converse is known to be true, cf. Exercise 6 in Section ...
Nick F's user avatar
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0 answers
52 views

Find a topological manifold that is not Hausdorff and not locally compact

Define a topological manifold as a space locally homeomorphic to $\mathbb{R}^n$. Find a topological manifold that is not Hausdorff and not locally compact. (Hint:Consider $\mathbb{R}$ with "extra ...
Ali's user avatar
  • 356
0 votes
0 answers
24 views

Uniformly Continuous and locally Lipschitz but not Globally Lipschitz Function on a "Connected but not compact" set

I know such a function exists but I can’t find an example. I have the famous example f:]0,inf[ --->R f(x)=sqrt(x) function. But I can't find any other function which is Uniformly Continuous and ...
máthēma's user avatar
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0 answers
16 views

Let $\epsilon>0$ and $f\in \mathscr D(\Omega).$ Then Prove that following sets $K_1$ and $K_2$ are compact and disjoint.

Let $\Omega \subseteq \mathbb R^n$ be an open set. $\mathscr D(\Omega)=\{f|f \in C^\infty(\Omega) \wedge \text{supp}(f)\subseteq \Omega \text{ is compact.}\}$ Let $\epsilon>0$ and $f\in \mathscr D(...
Unknown x's user avatar
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0 votes
1 answer
55 views

Is every compact set equal to an intersection of nested bounded sets with smooth boundary?

Let $K$ be a compact set of (say) the plane $\mathbb{R}^{2}$. Do there exist bounded open sets $(U_{n})_{n\in\mathbb{N}}$ with $C^\infty$-boundary $\partial U_{n}$ such that $$\ldots\subseteq U_{n+1}\...
Calculix's user avatar
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1 vote
1 answer
75 views

Are all complex algebraic varieties in 2+ variables unbounded as a result of Hartogs' extension theorem?

Hartogs' extension theorem states that for any $n\geq 2$, $U\subseteq\mathbb C^n$, $K\subset U$ compact (in $\mathbb C^n$) and a holomorphic function $f:U\setminus K\to\mathbb C$, it can always be ...
Boris Dimitrov's user avatar
2 votes
1 answer
63 views

Last Bits of Proof of the Compactness Theorem in Propositional Logic

I am reading the proof of compactness theorem for the propositional logic and the last part of the proof is left as exercise 2 of section 1.7 in the book by Enderton, A Mathematical Introduction to ...
Hosein Rahnama's user avatar
5 votes
0 answers
79 views

Must locally compact and weakly Hausdorff spaces be regular?

In a recent pull request to the π-Base, it was observed that all locally compact and KC (Kompacts are Closed) spaces are regular: since compacts are closed, each local neighborhood base of compacts is ...
Steven Clontz's user avatar
4 votes
1 answer
60 views

Showing particular quotient space is (not) compact, connected and Hausdorff

I came across the following question, I'm unsure about some of my answers. Let $U = \{(x, y) \in \mathbb{R}^{2} \mid y \in \{0, 1\}\}$ be a subspace of $\mathbb{R}^{2}$. We define the following ...
JLGL's user avatar
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0 answers
22 views

Understanding the definition of compactly generated space

A compactly generated space (or a $k$-space) is a topological space $X$ where every subset $A\subset X$ is open iff, for every compact subset $K\subset X$, the intersection $A\cap K$ is open in the ...
user760's user avatar
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0 votes
0 answers
27 views

Why is sequences enough in the definition of a normal family

In the definition of a normal family in complex analysis, we are concerned with a sequence of functions having a subsequence uniformly converging to a function on compact subsets of an open domain. ...
user760's user avatar
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0 votes
1 answer
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Does this theorem hold under specific conditions and not in general?

In baby rudin, Thm 2.34, states: Compact subsets of metric spaces are closed. The proof goes as : Proof Let $K$ be a compact subset of a metric space $X$. We shall prove that the complement of $K$ ...
P_oly_math's user avatar
-2 votes
1 answer
53 views

Compact set covered by closed balls with positive radii [closed]

Let $K\subseteq\mathbb{R}^2$ be a compact subset. Suppose that it is covered by a collection of closed disks with positive radii. Is there a finite subcover?
ashpool's user avatar
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