# All Questions

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### Implicit/Explicit Time Dependence for Melnikov Functions

My question concerns an article by Koiller and Carvalho found here: http://link.springer.com/article/10.1007/BF01260390 On page 645, they parameterize the time variable $t$ in terms of one of the ...
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### Complex structure on the set of prequantization line bundles

For geometric quantization, the set of equivalence classes of prequantization line bundles of a quantizable symplectic manifold $(M, ω)$ is parametrized by $H^1(M, S^1)$ which represents the ...
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### If a family of complex analytic space is smooth

If I have a deformation in complex analytic space setting. The parametrize space is U, total space is X. If U is smooth and every fiber X(t) is smooth, if X is smooth and the map from X to U is ...
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### Why the intersection of a scott open (or \w the relatively compactness property) filter on a topology of a sober (and 2nd countable) space is compact?

Definitions and notations. Let $\mathcal{P}(X)$ the power set of $X$. Let $\tau_X\subseteq\mathcal{P}(X)$ a topology on X. We call $A$ irreducible if every time $A=B\cup C$ with $B,C$ closed set ...
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### Are there workable numerical approaches for the pentagon equation?

Warning: this post is the "numerical" analog of Are there workable algebraic geometry approaches for the pentagon equation? I've replaced "algebraic geometry" by "numerical" in its content, ...
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### The Cauchy Problem in General Relativity: Existence of a Hausdorff Development

This is related to a problem that I posed about a year ago. I was given several references by a number of experts who were kind enough to entertain my rather arcane question. Those references were ...
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### Zariski open set of linear forms

Let $I$ be a graded homogeneous ideal over $k[x_1, ... ,x_n]$ and $h$ a linear form, let $H$ be the corresponding hyperplane and $I_H$ the restriction of $I$ to $H$. I am looking for a Zariski open ...
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### How to characterize elements in the Bruhat open cell? [migrated]

This might be an elementary question. For simplicity, let's assume $G=GL(n,F)$, where $F$ is a local field. Let $U$ be the subgroup of upper triangular unipotents, $A$ the subgroup of diagonal ...
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### Alternating series sum [on hold]

How to find such alternating series sum? $$\sum_{n = 0}^\infty \frac {(-1)^{n-1}}{3^{n-1}}$$
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### Open covering of the Hilbert functor of points

Let $R \to A$ be a homomorphism of commutative rings. Define the functor $$\mathrm{Hilb}^n_{A/R} : \mathsf{CAlg}(R) \to \mathsf{Set}$$ as follows: If $B$ is a commutative $R$-algebra, then ...
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### Is der a relation between the product of 2 numbers and their sum? [on hold]

a * b = x a + b = y Is there a way to obtain y from x without using a,b ? PS: a,b are prime-numbers. so there is only one possible y.
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### Is Independent University of Moscow recognized? [on hold]

What graduate schools recognize the degree from Independent University of Moscow? It is not a university strictly speaking and their degree doesn't have any official status in Russia, but they claim ...
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### Can this graph polynomial be efficiently computed?

I am a physicist, so apologies in advance for any confusing notation or terminology; I'll happily clarify. To provide a minimal amount of context, the following graph polynomial came up in my research ...
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### Software tools for medium-scale systems of polynomial equations

I am attempting to find all real solutions of a system of 12 polynomial equations in 12 unknowns. The equations each have total degree 6 and contain up to 1700 terms. I am only interested in real ...
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### Symmetric group representation from alternating groups [on hold]

Is the symmetric group $S_n$ isomorphic to a direct sum or tensor product of alternating groups $A_m$? Can any combination of alternating groups ($(A_m \otimes A_m)\oplus A_m$ .. etc) yield a valid ...
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### Asymptotic expansion on 3 nonlinear ordinary differential equations [on hold]

The 3 nonlinear differential equations are as follows $$\epsilon \frac{dc}{dt}=\alpha I + \ c (-K_F - K_D-K_N s-K_P(1-q)), \nonumber$$ \frac{ds}{dt}= ...
### Compute an arbitrary decimal place of $\pi$
Is there a method to find the value of the $n$-th decimal place of $\pi$ which is more efficient than having to compute all decimal places before as well?