Selective Survey on Spaces of Closed Subgroups of Topological Groups
Abstract
:1. Chabauty Spaces
1.1. From Minkowski to Chabauty
- for every compact K of X such that , there exists such that for each ;
- for every and every neighborhood U of x, there exists such that for each .
1.2. Pontryagin–Chabauty Duality
1.3. for Compact G
1.4. for LCA G
1.5. as a Lattice
- (i)
- ∧ is continuous;
- (ii)
- ∧ and ∨ are continuous;
- (iii)
- G is the semidirect product , where K is profinite with finite Sylow p-subgroups, P is Abelian profinite and each Sylow p-subgroup of G is , , and the centralizer of each Sylow p-subgroup of G has a finite index in G.
- (i)
- G is either discrete or periodic;
- (ii)
- ∧ is continuous in for each compact subgroup H of G;
- (iii)
- the centralizer of each topological p-element of G is open.
1.6. From Chabauty to Local Method
- contains and G;
- is linearly ordered by the inclusion ⊂;
- for any subset of , the closure of and ;
- whenever A and B comprise a jump in (i.e., , and no members of lie between B and A), B is a normal subgroup of A.
- for every and every neighborhood U of x, there exists such that for each ;
- for every , there exist a neighborhood of y and a such that for each .
1.7. Spaces of Marked Groups
1.8. Dynamical Development
2. Vietoris Spaces
- for each open subset U of X such that , there exists such that for each ;
- for each and each neighborhood of x, there exists such that for each .
2.1. Compactness
- (i)
- G is compact;
- (ii)
- , where are distinct prime numbers, K is finite, and each is not a divisor of ;
- (iii)
- , where K is finite and p does not divide .
2.2. Metrizability and Normality
2.3. Some Cardinal Invariants
3. Other Topologizations
3.1. Bourbaki Uniformities
3.2. Functionally Balanced Groups
3.3. Lattice Topologies
3.4. Segment Topologies
3.5. -Topologies
- if , then contains some ;
- for every , there exists such that for each , ;
- for each
- for every , there is a such that , ( means that, for every , there exists such that );
- for every , there exists such that if and for each , then for some ;
- for each and every neighborhood V of x, there exists such that , for some .
- for any , there exists such that for each ;
- for any , there exists such that for each .
3.6. Hyperballeans of Groups
Funding
Conflicts of Interest
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Protasov, I.V. Selective Survey on Spaces of Closed Subgroups of Topological Groups. Axioms 2018, 7, 75. https://doi.org/10.3390/axioms7040075
Protasov IV. Selective Survey on Spaces of Closed Subgroups of Topological Groups. Axioms. 2018; 7(4):75. https://doi.org/10.3390/axioms7040075
Chicago/Turabian StyleProtasov, Igor V. 2018. "Selective Survey on Spaces of Closed Subgroups of Topological Groups" Axioms 7, no. 4: 75. https://doi.org/10.3390/axioms7040075
APA StyleProtasov, I. V. (2018). Selective Survey on Spaces of Closed Subgroups of Topological Groups. Axioms, 7(4), 75. https://doi.org/10.3390/axioms7040075