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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 $$\lVert(a_{ij})\rVert \le C \Bigl\lVert\s...
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Q&A for professional mathematicians
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Hottest Questions Today - MathOverflow
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0 days
Gorenstein terminal singularity and cDV singularity in positive characteristic
Miles Reid proved that isolated compound du Val singularities are precisely Gorenstein terminal singularities.
Does this hold in positive characteristic setting?Are there any know result? -
3 days
Maximum of $\sum_{n=1}^N z^T X(P_n X + I)^{-1}z$ over unit trace, positive semid...
Let $z$ denote a unit vector.Fix a finite collection of positive semidefinite matrices $\mathcal{P}$.Define the function and set$$f_{\mathcal{P}}(X) = \sum_{P \in \mathcal{P}} z^T X(PX + I)^{-1} z, \quad \mbox{and} \quad \mathcal{X} = \{X \succeq 0,...
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0 days
Steenrod powers of the Thom class
René Thom in 1952 proved the formula$$Sq^i(U_2)=\Phi_2(w_i),$$which in modern parlance says that the Steenrod squares of the mod $2$ Thom class of an orthogonal bundle are the images under the mod $2$ Thom isomorphism of the Stiefel-Whitney classes.
Apparently there is a mod $p$ analogue of this formula for oriented bundles, in which the $Sq^i$ are replaced by Steenrod powers $P^i_p$ and the $w_i$ are replaced by polynomials in the Pontryagin classes. Thom refers to this in his famous paper 195... -
13 days
Doubly transitive groups in which a point stabilizer has an abelian normal subgr...
Let $G$ be a finite doubly transitive group in its action on the set $X$, such that a point stabilizer $G_x$ ($x \in X$) has an abelian normal subgroup $N_x$.
I have read that if $\vert N_x \vert$ is even and $N_x$ acts semi-regularly on $X \setminus \{ x \}$ (Hering, 1972), or if $N_x$ does not act semi-regularly on $X \setminus \{ x \}$ (O'Nan, 1975), such permutation groups are classified without CFSG....
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