# All Questions

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### Existence of minimizer in Sobolev space $H^{1,2}(\Omega)$

I am looking at a functional $$\frac{\int_{\partial \Omega} u^2 \mathrm{dx}}{ \left(\int_{\Omega} u^q \mathrm{dx} \right)^{2/q} }$$ And i want to know if the minimizer exists in the space ...
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### A linear category with objects of infinite length but which is otherwise finite?

Fix a ground field $k$. By a linear category I will mean an Abelian category which is compatibly enriched over $k$-vector spaces. A linear category is called finite if it satisfies the following four ...
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### Computing row-sum scaled unsigned Stirling nos. of the 1st kind

As the title suggests, I would like to compute probability vectors with elements proportional to (unsigned) Stirling numbers of the first kind by row. For easy reference, here is the Wiki page. For ...
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### Semigroup nilpotents and compostional inversion

The integer coefficients of a general partition formula for the compositional inverse of a function are a refined version of the coefficients of the generating series for the number of nilpotents in a ...
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### Is holomorphic 2-form on Moduli of Higgs bundle in Biswas' paper is non-degenerate

In Biswa's paper, Geometry of moduli of higgs bundle, he defined holomorphic 2-form on moduli of stable higgs bundle, using kodaira-spensor map and peterson-weil metric. I want to know whether this ...
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### Is the parallelogram rule an axiom or a theorem in euclidean geometry? [on hold]

I am aware of the proof of the rule in inner product spaces. Excluding the geometry of Descartes, is it possible to prove parallelogram rule or is it an axiom?
i want to find a lower bound on the following expression: $tr(AXA^T)$ in terms of $tr(X)$ where A is real $n\times n$ matrix and $X>0$ is positive symmetric. It seems that the following bound is ...