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Q&A for professional mathematicians
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Let $A$ be a $C^*$-algebra and $(a_{ij}) \in M_n(A)$ be a positive matrix. Does there exist a constant $C \ge 0$ (not depending on the $a_{ij}$) such that $$\lVert(a_{ij})\rVert \le C \Bigl\lVert\s...
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Hottest Questions Today - MathOverflow
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Mathoverflow.net news digest
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0 days
Morse function for quotient of manifold?
I have a closed (compact without boundary) manifold M and a compact Lie group G that acts on it. I wan't to understand the topology of $M/G$, at least compute its singular homology groups. The action isn't free, so $M/G$ may not be a manifold. Because...
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0 days
An explicit "easily" computable-and-invertible mapping between permutations?
TL;DR version: With the magician's back turned, a spectator shuffles a standard deck of $n=52$ playing cards and selects and arranges $m=27$ of them face-up in a row left to right. The magician's assistant turns one of these cards face-down, leaving...
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What is this vague time in the terminology of topology?
Okay, loosely speaking, a homeomorphism is a continuous, bijective, and invertible mapping. A homotopy is a continuous deformation of a topological space with a parameter. An isotopy is a homotopy that is a homeomorphism in the interval from 0 to 1....
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0 days
Polynomial conditions on cycle space of simple graph
Let $G=(V,E)$ be a simple graph and $\Phi:=\lbrace \phi\rbrace$ a set of cycles such that for every edge $e\in E$ there is a $\phi\in \Phi$ such that $e\in \phi$. We say that $\Phi$ covers $G$. Assume that the closure $\hat{\Phi}$ of $\Phi$ with respect...
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