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Top Questions
10
votes
Computing curvature of the quotient of the tautological connection
differential-geometry
gauge-theory
asked Feb 23, 2019 at 1:04
math.stackexchange.com
10
votes
Curvature of tautological connections over the space of connections
dg.differential-geometry
gauge-theory
asked Mar 4, 2019 at 19:43
mathoverflow.net
9
votes
What is the earliest work with the time-loop trope?
history-of-literature
tropes
asked May 29, 2019 at 5:34
literature.stackexchange.com
5
votes
Relating two notions of integrable almost complex structure on a complex vector bundle
vector-bundles
complex-manifolds
almost-complex
asked Oct 23, 2016 at 21:51
math.stackexchange.com
Top Answers
77
Mathematicians' Tensors vs. Physicists' Tensors
math.stackexchange.com
12
Are there fewer reals on $(0, 1)$ than on $(1,\infty)$?
math.stackexchange.com
12
Difference between several books on complex geometry
math.stackexchange.com
9
solenoid and irrotational vector
math.stackexchange.com
9
Does "taking the integral of both sides" of an equation preserve equality?
math.stackexchange.com
9
How to compute the derivative of $\sqrt{x}^{\sqrt{x}}$?
math.stackexchange.com
9
Kernel of a bounded linear operator on a normed linear space need not be closed or open?
math.stackexchange.com
9
When is the blow up morphism flat?
math.stackexchange.com
8
Intuition of coset of a subgroup
math.stackexchange.com
8
Can this be the class-equation of a finite group $G$ of order 10?
math.stackexchange.com
7
Understanding the geometry of the cross $\operatorname{Spec}(k[x,y]/(xy))$
math.stackexchange.com
6
Prove that $ a^2-4b \neq2$ if $ a,b \in \mathbb{ Z}$
math.stackexchange.com
6
algebraic variety of dimension 0
math.stackexchange.com
6
$\mathbb R^n$ vector space over $\mathbb R$, $\mathbb F_p^n$ vector space over $\mathbb F_p$. Is $\mathbb R^n \cong \mathbb F_p^n$ as vector spaces?
math.stackexchange.com
6
Non singular complex projective variety is a smooth manifold?
math.stackexchange.com
5
$L^1$ convergence and almost everywhere convergence
math.stackexchange.com
5
Is there a complex structure on $\mathbb{R}^2$ such that $f(x,y) = x-iy$ is analytic?
math.stackexchange.com
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