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Complex analysis, holomorphic functions, automorphic group actions and forms, pseudoconvexity, complex geometry, analytic spaces, analytic sheaves.

9 votes
1 answer
222 views

Is $(m,n)=(2,3)$ the only solution to $\sum_\limits{k \in\Bbb Z}\frac1{(W_k(x)+1)^m}=\sum_\l...

From discussions 1, 2, @HenriCohen wrote a paper on Lambert $W$-Function Branch Identities which includes identities such as $$\sum_\limits{k \in\Bbb Z}\frac1{(W_k(x)+1)^2}=\sum_\limits{k \in\Bbb Z}\f …
TheSimpliFire's user avatar
5 votes
1 answer
357 views

Is there a meaningful interpretation of an $L^i$-space?

Do complex-normed spaces exist? Is there an extension of $p$-norms to $p\in\Bbb C\setminus\Bbb R$? A while ago I thought of extending $L^p$-spaces to the complex-normed setting. After some discussions …
TheSimpliFire's user avatar
30 votes
1 answer
4k views

Proof of "Possible new series for $\pi$" without use of physics

Related post: The post Possible new series for $\pi$ is about whether the identity is new, so to avoid confusion I was advised to ask this question separately. I am looking for a proof of the follo …
TheSimpliFire's user avatar
4 votes
1 answer
183 views

Maximal increasing behaviour of $\sqrt{-\log x}\operatorname{Li}_{1/2}(x)$

This is an extension of a problem in mathematical biology. It appears that For any $\varepsilon>0$, there exists an interval $I\subset(0,1)$ on which $\sqrt{-\log x}^{1+\varepsilon}\operatorname{Li}_ …
TheSimpliFire's user avatar
2 votes

New series for $\pi$ from string theory

It is unlikely $S(1)$ has a closed form. We have \begin{align}S(1)&=4\sum_{k\ge1}(-1)^k\binom{-1/(4k)}k\frac{2k}{2k+1}\end{align} and (substituting $\lambda=0$ in the original Saha-Sinha formula for $ …
TheSimpliFire's user avatar