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fa.functionalanalysis
1h

reviewed  Close concentric spheres with common radius 
1h

reviewed  Close Metric equivalence 
1h

reviewed  Close Does this numerical series have any special name? 
1h

reviewed  Close Research on unique 2d geometric structures  terminology and resources 
1h

reviewed  Close Find the number of connected components in pseudospectra 
1h

reviewed  Reopen 3dimensional vectors satisfying certain equalities 
1d

reviewed  Leave Closed How to find singularities from data and find monodromy group from singularities and differential system? 
1d

reviewed  Leave Closed Hard maths on viXra? 
1d

reviewed  No Action Needed A comninatorical sum involving ratios of binomials 
1d

reviewed  Reviewed Is it possible to write down the explicit expressions of some extensions of conformal vector fields on spheres? 
1d

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Circle actions on graph C*algebras
@ChrisRamsey: oh, I see. I'm guessing the answer to the second part is "no" but I'd like to see the definition of "quotient". 
1d

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Circle actions on graph C*algebras
@ChrisRamsey: is that in response to my question? This is not what I asked. 
2d

reviewed  Approve topologicalgroups tag wiki excerpt 
2d

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Circle actions on graph C*algebras
For those who aren't very familiar with graph C*algebras, could you please define "quotient of a graph algebra by an action"? 
2d

reviewed  No Action Needed A solution for this equation with a certain condition 
2d

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Free modules over integers
@truebaran: this completely answers your question and you ought to accept it. 
2d

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Realisation of the noncommutative torus as a universal $ C^{*} $algebra
@truebaran: this seems like a very complete answer to your question, why don't you accept it? 
2d

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Measure of intersections in probability spaces
(The theorem you could cite is that this space is measurably equivalent to the interval $[0,\delta]$, but for the purpose of constructing a counterexample you could just work with the product space union an interval of length $\epsilon$. So the citation is unnecessary.) 
2d

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Measure of intersections in probability spaces
For the existence of the $B_i$, you could do this: work in the product of a sequence of copies of $[0,1]$ and let $B_i'$ be the product of $[0,(12^{i})\frac{\epsilon}{\delta}]$ on the $i$th factor and $[0,1]$ on ever other factor, where $\delta = 1\epsilon$. Then scale the whole product by $\delta$. 
2d

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Measure of intersections in probability spaces
This is the right way to do it. 