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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
Is a fiberwise equivalence an equivalence for finite simplicial complexes?
Given continuous maps of topological spaces $X\xrightarrow{f}Y\xrightarrow{g}Z$ such that the induced map of preimages $(g\circ f)^{-1}(z)\xrightarrow{\simeq}g^{-1}(z)$ is a (homotopy or weak) equivalence for each $z\in Z$, when one can guarantee that...
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0 days
Are flat projective structures on manifolds with finite fundamental group metriz...
A projective structure $[\nabla]$ is an equivalence class of affine connections inducing the same unparametrized geodesics. It's metrizable if the equivalence class contains the Levi-Civita connection of some metric. A flat projective structure is equivalently...
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0 days
Subsets $S_1,S_2$ of $\mathbb{F}_p$ with equal sum, such that $S_1\Delta S_2$ in...
Let $p$ be a prime, $S\subseteq \mathbb{F}_p$ be a subset satisfying $2^{\#S}>p$. By the Dirichlet Box Principle, there exist distinct subsets $S_1,S_2\subset S$ such that $\sum_{s\in S_1}s=\sum_{s\in S_2}s$. I am wondering what can be said about...
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9 days
Floorplans for the Mondrian Art Puzzle
Let us say that a tiling of a square into rectangles is Mondrian if the rectangles (1) are pairwise non-congruent and (2) have the same area. It is an outstanding open problem whether there exists a Mondrian tiling of a square in which the side lengths...
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