MathOverflow

I'm wondering if a classification of analytic functions $f$ (it may be that $C^1$ is enough, but I'm not taking any chances, if you have a reason why I only need to consider a larger class of functions, I would enjoy that as well) with the property ...

I have been working on this elliptic curve equation:$y^2 = 102516622445224071181618629075661543598435443927642055302797028500\cdot x^{3} + 170288003150088713211165229564777675866712767658935950737783670400\cdot x^{2} + 942871615197123245625774117840...

Let $H = \{ (a,b,c) \in \mathbb{Z}_{\geq 0}^3 : a+b+c=n \}$. If we have a probability distribution on $H$, we can take its marginals onto the $a$, $b$ and $c$ variables and obtain three probability distributions $\alpha$, $\beta$ and $\gamma$ in $\mathbb...

There is no way around the fact that determinations about the relative contributions of papers and journal acceptances will always be highly subjective. In addition, editors and referees are busy people and contribute their time on a near volunteer basis...