Questions tagged [gn.general-topology]
Continuum theory, point-set topology, spaces with algebraic structure, foundations, dimension theory, local and global properties.
3,050
questions
0
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0answers
31 views
A Uniform Metric Selection Theorem
Let $X$ and $Y$ be bounded complete separable metric spaces. Let $C = 2^\omega$ be Cantor space with its standard metric. All product spaces are taken to have the max metric.
Let $F, G \subseteq X\...
3
votes
2answers
161 views
Some special closed sets in the Bohr compactification of the reals
Let $X$ denote the Bohr compactification of the reals. What can be said about the intersection of $\overline{\mathbb R^+}^X$
with $\overline{\mathbb R^-}^X$, the closures in $X$ of $\mathbb R^+:=\{...
2
votes
0answers
35 views
Non-cut points and metrizability
In a paper I'm writing, I happened upon a proof of:
Theorem. If $X$ is a separable Hausdorff continuum with only countably many non-cut points, then $X$ is a dendrite.
A continuum is a compact ...
1
vote
1answer
80 views
Size of the orbit of a dense set
This question is a follow-up to: this post.
Let $X$ be a separable Banach space, $\phi\in C(X;X)$ be an injective continuous non-affine map, and $A$ be a dense $G_{\delta}$ subset of $X$. How big ...
5
votes
1answer
161 views
Haar-null union of dense subsets
Let $\{X_i\}_{i \in \mathbb{R}-\{0\}}$ be a set of subsets of a separable infinite-dimensional Fréchet space $X$ and $I$ be uncountable. Moreover, suppose that
(Dense $G_{\delta}$) $X_i$ is a dense ...
3
votes
0answers
58 views
The Borel class of a countable union of $G_\delta$-sets, which are absolute $F_{\sigma\delta}$
Problem. Assume that a metrizable separable space $X$ is the countable union $X=\bigcup_{n\in\omega}X_n$ of pairwise disjoint $G_\delta$-sets $X_n$ in $X$ such that each $X_n$ is an absolute $F_{\...
6
votes
0answers
86 views
Generalization of pseudogroups
Pseudogroups are defined here: https://ncatlab.org/nlab/show/pseudogroup
One of the problems with defining manifolds in terms of pseudogroups is that it gives no notion of a morphism between ...
2
votes
1answer
128 views
Locally compact cut-point space homeomorphic to reals?
Suppose $X$ is a connected separable metric space, and $X\setminus \{x\}$ has exactly two connected components for every $x\in X$.
If $X$ is locally connected, then $X\simeq \mathbb R$. This was ...
4
votes
0answers
51 views
“Robust” Noninjectivity of a Continuous Mapping of a Sphere into the Plane
Let $X=\mathbb{S}^2$ and $Y=\mathbb{R}^2$ and $f:X\to Y$ a continuous mapping. Is it true that there must exist a nonempty set $V\subset f(X)$, open in $f(X)$ (in the subspace topology), such that ...
6
votes
2answers
199 views
Ideal characterization of almost convergence
$\bullet$ A real sequence $x=(x_n)_n$ is called convergent to $\alpha$ in usual sense if for any $\epsilon>0$ the set $\{n\in\mathbb N:|x_n-\alpha|\geq\epsilon\}$ is finite.
$\bullet$ A real ...
9
votes
0answers
56 views
Embedding of regular spaces in countably compact Hausdorff spaces
It is well-known that each completely regular space embeds into a compact Hausdorff space.
Problem. Is it true that each regular space embeds into a countably compact Hausdorff space?
The problem ...
4
votes
1answer
161 views
Functor From Rings into Compact Hausdorff Spaces
There is an adjunction $\text{Bool}^{op} \leftrightarrow \text{Set}$ between boolean algebras and sets which sends a boolean algebra to the set of its prime ideals and a set $X$ to $[X, \mathbb{F}_2]_{...
5
votes
0answers
62 views
Rough classification of Peano Curves
By Peano curve I mean a continuous map from the unit interval that fills the unit square in $\mathbb R^2$.
In the paper:
Shchepin, E. V.; Bauman, K. E., Minimal Peano curve, Proc. Steklov Inst. Math....
2
votes
2answers
87 views
Hilbert Scale Inclusions
I'm looking at properties of the scale of Hilbert spaces $(X_s)_{s\in \mathbb{R}}$, which are constructed as follows. Starting with $A:D(A)\subset H\to H$, $A$ a densely defined, strictly positive ($...
1
vote
0answers
82 views
Subspaces of compact spaces and quotients of Hausdorff spaces
Let $\operatorname{Top}$ be the class of topological spaces. Furthermore, let $\mathcal{U}\subset\operatorname{Top}$ and $\mathcal{V}\subset\operatorname{Top}$ classes satisfying the following ...
4
votes
1answer
155 views
Is a free and discrete group action on the plane a covering space action?
Let $\mathbb{R}^2$ be the plane, and let a group $G$ act on it with orientation preserving homeomorphisms, and assume that
every orbit of $G$ is a discrete subset in $\mathbb{R}^2$
$G$ acts freely: ...
35
votes
1answer
2k views
Which polygons can be turned inside out by a smooth deformation?
Take a non-degenerate polygon with side lengths $\{a_1,\dots,a_n\}$ in a convex configuration. What is the condition on the $a_i$'s so that the polygon can be turned inside out by a continuous motion ...
12
votes
1answer
469 views
Open subspaces of CW complexes
I am looking at the paper
Covering homotopy properties of maps between CW complexes or ANRs
by
Mark Steinberger and James West
and a claim is made in the proof of their first main theorem ...
3
votes
1answer
116 views
Subsets of reals which are both $F_{\sigma\delta}$ and $G_{\delta\sigma}$
Let $X\subseteq \mathbb R$ such that
$X$ is an $F_{\sigma\delta}$-set (in $\mathbb R$); and
$X$ is a $G_{\delta\sigma}$-set.
It is not necessarily true that $X$ must be $F_\sigma$ or $G_\delta$. A ...
1
vote
0answers
139 views
topological properties of $G_{\delta}$ sets in a compact Hausdorff space
I am trying to understand a family of types $\mathcal{F}$ in the set $S(A)$,the set of complete types over $A$ (in the sense of types in model theory) which is a compact and Haurdorff space equipped ...
1
vote
1answer
90 views
Collineations of projective spaces and isomorphisms of fields
For a (topological) field $F$ by $FP^2$ we denote the projective plane, i.e., the quotient space of $F^3\setminus\{0\}^3$ by the equivalence relation $\vec x\sim\vec y$ iff $\vec x=\lambda\vec y$ for ...
2
votes
1answer
93 views
Properties of the topology of sequential convergence $\tau_{seq}$
Let $(X,\tau)$ be a Hausdorff space. Denote by $\tau_{seq}$ the topology on $X$ whose closed sets are the sequentially $\tau$-closed subsets of $X$. I have read that $\tau_{seq}$ has the following ...
6
votes
0answers
160 views
On the universal property for interval objects
In his lecture, The Categorical Origins of Lebesgue Measure, Professor Tom Leinster mentions the following theorem:
Theorem 1: (Freyd; Leinster) The topological space $[0, 1]$ comes equipped with ...
1
vote
1answer
258 views
Does using continued fractions work to give a homeomorphism $\mathbb{Q}^+ \rightarrow (\mathbb{Q}^+)^2$?
Let $\mathbb{Q}$ be the topological space of rational numbers (with topology induced by inclusion in the real line) and let $\mathbb{Q}^+$ be the set of positive ($x>0$) rationals.
I'm looking ...
1
vote
0answers
61 views
If all length metrics are strong equivalent on a closed connected topology manifold?
Let $M$ be a connected closed topology manifold and $d$ is a length metric (or an inner metric) on it , i.e. the distance between every pair of points is equal to the infimum of the length of ...
1
vote
1answer
60 views
Structure of extensions arising in Lie approximation of connected groups
My imperfect understanding is that, by the work of various authors (Gleason, Yamabe, Montgomery, Zippin ...), the following result is known:
Let $G$ be a connected, locally compact, Hausdorff group, ...
0
votes
0answers
96 views
Cardinal Invariants and Physics
There are many applications of topology to physics, but I wonder if there is a known application of cardinal invariants to physics.
3
votes
1answer
148 views
Must a locally compact, second countable, Hausdorff space support a Radon measure?
Let $X$ be a locally compact, second countable and Hausdorff space, must there be a Radon measure on $X$ whose support is $X$?
The motivation for this question comes from Anton Deitmar's paper On ...
8
votes
1answer
276 views
In a subset of $\mathbb{R}^2$ which is not simply connected does there exist a simple loop that does not contract to a point?
I previously asked In which topological spaces does the existence of a loop not contractable to a point imply there is a non-contractable simple loop also?
Given the broad scope of this question I ...
3
votes
1answer
197 views
In which topological spaces does the existence of a loop not contractible to a point imply there is a non-contractible simple loop also?
In another MathOverflow post I asked: In a topological space if there exists a loop that cannot be contracted to a point does there exist a simple loop that cannot be contracted also?
Note that ...
3
votes
1answer
138 views
Is every closed subset of finite measure contained in an open subset of finite measure?
Could someone will verify my statement: For every locally finite Borel measure on metric space and closed set $F$ with finite measure, there exists open set $U$ such that $F \subset U$ and $U$ has ...
33
votes
3answers
4k views
In a topological space if there exists a loop that cannot be contracted to a point does there exist a simple loop that cannot be contracted also?
I'm interested in whether one only needs to consider simple loops when proving results about simply connected spaces.
If it is true that:
In a Topological Space, if there exists a loop that cannot ...
3
votes
1answer
148 views
Is this set of fractions dense in the interval $\big[\frac 13,\frac 12\big)$?
I have an interest in the set
$$A= \bigg\{\frac{ab+c}{(2a+1)b+c}\,\bigg|\, a \in {\mathbb Z}^+, b\in{\mathbb Z}^+~\text{is \((a+1)\)-smooth}, 0\leq c\leq ab\bigg\}.$$ In particular, is $A$ dense in ...
12
votes
1answer
348 views
Is the set of escaping endpoints for $e^z-2$ completely metrizable?
Let $f:\mathbb C \to \mathbb C$ be the complex exponential $$f(z)=e^z-2.$$ It is known that $J(f)$, the Julia set of $f$, is a uncountable collection of disjoint rays (one-to-one continuous images ...
1
vote
0answers
35 views
Sobolev tensor spaces and finite ranks
Let $W^{2,2}(\Omega_i)$, $\Omega_i = [-1,1]$, $i = 1,\ldots,d$ be the Sobolev spaces of twice weakly differentiable, square integrable functions. Let further $\otimes_a$ denote the algebraic tensor ...
7
votes
1answer
325 views
Normal bundle of Whitney embedding
Let $X$ be a real $n$ dimensional manifold. One knows that it can be embedded into $\mathbb{R}^{2n}$ by the Whitney embedding theorem. The normal bundle for such an embedding will be a rank $n$ real ...
3
votes
0answers
33 views
Is the space of $p$-geometric rough paths is Homeomorphic to Frechet Space
Let $\Omega G^p([0,T];\mathbb{R}^n)$ be a space of $p$-geometric rough paths with values in $\mathbb{R}^n$. Is $\Omega G^p([0,T];\mathbb{R}^n)$ homeomorphic to some Fr\'{e}chet space?
3
votes
0answers
53 views
Are $T_0$ topological quasigroups completely regular?
In 1957 H. Salzmann generalized to quasigroups but weakened the standard result that $T_0$ topological groups are completely regular. He was able to show that $T_0$ topological quasigroups are regular ...
0
votes
0answers
44 views
$L^p $ Space with Values in Metric Space Homeomorphic
Let $(X,d_X,m_X)$ and $(Y,d_Y,m_Y)$ be complete $\lambda$-doubling metric measure spaces and $p \in [1,\infty)$. Moreover, suppose that there exists a homeomorphism $\Phi$ from $(Y,d_Y)$ to some ...
8
votes
3answers
857 views
Link of a singularity
I would like to understand the topological type of a link of a singularity in a simple example. Consider for instance the cone ${xy-z^2=0}\subset\mathbb{C}^3$.
If we set $x = x_1+ix_2, y = y_1+iy_2, z ...
3
votes
1answer
171 views
Research in compactifications of locally compact spaces
I would like to know how is it going the research in compactifications of locally compact Hausdorff spaces. Are there people doing this? Are there relevant conjectures on it?
4
votes
0answers
171 views
The k-ification of the compact-open topology for weak Hausdorff compactly generated spaces
Let CGWH be the category of weak Hausdorff compactly generated spaces; see e.g.
N.P. Strickland. THE CATEGORY OF CGWH SPACES: Preprint available from
https://neil-strickland.staff.shef.ac.uk/courses/...
8
votes
1answer
162 views
Do the higher levels of the Borel hierarchy correspond to absolute topological properties?
It is well known that a subset $Y$ of a Polish space $X$ is completely metrisable iff it is a $G_\delta$ subset. This relates a relative topological property of the subspace $Y \subset X$ to an ...
8
votes
1answer
227 views
Is a cofinite topology for a set with cardinality between $\aleph_{0}$ and $2^{\aleph_{0}}$ path-connected?
It is easy to show that $\mathbb{N}$ with the cofinite topology is not path connected and that any set with cardinality $\geq 2^{\aleph_0}$ equipped with the cofinite topology is in fact path ...
2
votes
0answers
140 views
Category of Manifolds and Maps: TOP $\supseteq$ TRI $\supseteq$ PL $\supseteq$ DIFF? [closed]
Please let me denote the following
(TOP) topological manifolds https://en.wikipedia.org/wiki/Topological_manifold
(PDIFF), for piecewise differentiable https://en.wikipedia.org/wiki/PDIFF
(PL) ...
7
votes
1answer
152 views
Fibers of continuous maps of $\mathbb{R}^n$ which are injective at dense points
Question. Suppose that $f\colon\mathbb{R}^n \to \mathbb{R}^n$ is a continuous map and there is a dense subset $D \subset \mathbb{R}^n$ such that $f^{-1}(f(x)) = \{x\}$ for all $x \in D$.
Is every ...
6
votes
1answer
131 views
Equivalence of $\sigma$-weak topology to another topology
Let $\mathcal H$ be a Hilbert space. Define a topology $\tau_1$ on $B(\mathcal H)$ by the family of seminorms $x\mapsto |Tr(xa)|,$ $a\in L^1(B(\mathcal H)).$ Here $B(\mathcal H)$ denotes the set of ...
0
votes
2answers
218 views
subspace topology and strong topology
Suppose $X$ is a locally convex space and $Y$ is a subspace of the strong dual of $X$, is the induced topology on Y equivalent to the strong topology $b(Y,Y')$ on $Y$? If this is not correct, then on ...
4
votes
1answer
208 views
Properties of Frechet distance
There is an old construction, apparently due to Frechet's PhD thesis (which is unfortunately written in French and in ancient notation), which turns the set of curves in a metric space modulo ...
7
votes
1answer
725 views
Cobordism Theory of Topological Manifolds
Unfortunately, due to my ignorance, my present knowledge is limited to the cobordism Theory of Differentiable Manifolds.
Cobordism Theory for DIFF/Differentiable/smooth manifolds
However, there are ...
