# All Questions

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### Lefschetz hyperplane theorem for Neron-Severi

Suppose that $X$ is a smooth projective variety of dimension at least $3$, and that $D$ is a smooth ample divisor. I am wondering to about the status of the Lefschetz hyperplane theorem for the map ...
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### Probability distribution of the distances between N mobile nodes in a square plain of length l [on hold]

For N randomly moving nodes enclosed in a square plain of length l. The (Nchoose2)W samples of the distances between the nodes are collected over a window of length W. We can assume W is large, what ...
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### Analytical value for the first eigenvalue of a certain spherical triangle

I am testing some numerical algorithms for computing the Laplace-Beltrami eigenvalues on the sphere. One thing that came up was computing the first eigenvalue of the "equilateral" spherical triangle ...
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### Is countably complete lattice bounded? [on hold]

I wonder if countably complete lattice is bounded and, if it is why ?
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### Proof for additivity of cumulants

If one does not define cumulants via the cumulant generating function (cgf), e.g. because the cgf does not exist, then an alternative way is to use the recusion \begin{align*} ...
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### Help with derivative rules [on hold]

Hi I need som help with some rules Y to Y'. 1: Y = A(^2)/B 2: Y = E(^2)/1 3: Y = E^(X+X) 4: Y = sin(X(^3))/cos(X(^2)) 5: Y = -X(^B)cos(B(^X)) What is the Y' of all functions?
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### On Q-Cartier Divisors

I have my question on Q-Cartier Weil divisor. People say $D$ is Q-Cartier divisor if $nD$ is Cartier for some $n \geq 1$. Especially for $n > 1$, I have never seen the `rigorous' definition of ...
### Numbers $n$ such that the sum of the divisors of $n$ is a nontrivial power
Let $\sigma (n)$ be the sum-of-divisors function. For example, $\sigma(7)=1+7=2^3$. I know some results about triplets of positive integers $(n,a,b)$ where $a,b\ge 2$ such that $\sigma (n)=a^b$, but ...