# All Questions

162 views

### Scheme of Higgs reductions

I'm reading the Bruzzo and Graña Otero's paper Semistable and Numerically Effective Principal (Higgs) Bundles; here: $X$ is a smooth, complex, projective variety; $G$ is a connected, complex, ...
160 views

### Homotopical interpretation of flatness?

I have read a discussion (in a less common language) which discussed a homotopical interpretation of flatness, which went something like: A map of commutative algebras is flat if pushing it out ...
26 views

### Can using Principal Components Analysis allow you identify redundant data and remove it from a dataset? [migrated]

I hope this is suitable for this forum: I am new to PCA and what I ultimately want to do is perform cluster analysis on my dataset. I have 20 physical descriptor variables for organisms, each with ...
144 views

### Well-ordering of power set of omega

Assuming initially the background set theory ZF, what is the exact status of the existence of a well-ordering on the power set of $\omega$? How much needs to be added to guarantee this?
89 views

### Topological properties via properties continuous maps

A topological space $(X,\tau)$ is connected if and only if the only continuous maps $f:X\to\{0,1\}$ (where $\{0,1\}$ carries the discrete topology) are the constant maps. Are there other examples of ...
78 views

131 views

### Card Game Feasibility 2

We play the following card game: We are given a deck of $M$ unique cards, each with a color $c\in\left\{ 1,\dots,C\right\}$ , and a number $d\in\left\{ 1,\dots,D\right\}$, so $M=CD$. We wish to ...
67 views

61 views

### Hausdorff Dimension of Exceptional Set for Carleson's Theorem

In Mattila's book Fourier Analysis and Hausdorff Dimension, Mattila presents a result of Barcelo, Bennett, Carbery, and Rogers about convergence of solutions of the Schrodinger equation to the initial ...
115 views

### What is known about the $q$-analogue of the simplex?

I am interested in the field with one element. I am thus interested in combinatorial interpretations of the Gaussian binomial coefficients. Richard Stanley's "Enumerative combinatorics" mentions ...
17 views

### Generalizing an expected increase in autocorrelation near a bifurcation point to a system of ODE

Near a bifurcation point, a stochastically forced dynamical system should show an increase in autocorrelation and variance. This is due to critical slowing (a loss in resilience to perturbations). ...
134 views

295 views

### What is the mathematics behind the random experiment which produces the data with this strange property?

I have a following scenario. there is a huge collection of data resulting from a random experiment $E$ (I do not say random variable yet, for reasons that you will need to explain in your answer). Let ...
44 views

### Reference request: compatibility conditions of four versions of Yetter-Drinfeld modules

There are four versions of compatibility conditions of Yetter-Drinfeld modules (left-left, left-right, right-left, right-right) in the article. Are there some references which derive these ...
96 views

### Blow-up of projective space is a projective bundle [on hold]

Suppose that $k$ is an algebraically closed field and let $X= \mathrm{Bl}_p(\mathbb{P}^n_k)$ be the blow-up of $\mathbb{P}^n_k$ at a point, and let $Y = \mathbb{P}^{n-1}_k$. I read something that ...
22 views

### Condensing two conditional constraints (with different signs) into one single constraint [on hold]

How can I condense these 2 constraints in the attached image into one linear constraint? Constraints
60 views

### W^{∞,p}(IRⁿ) are separable space for 1<p<∞ [on hold]

How can prove that the space W^{∞,p}(IRⁿ) are separable space
223 views

### Are There Mutually Exclusive Large Cardinal Axioms in ZFC?

The various large cardinal axioms are usually described in terms of some roughly linear hierarchy of varying consistency strengths. However, some cardinal axioms potentially contradict one another. As ...
### How to show that Yetter-Drinfeld condition is equialent to $\Psi$ is a braiding
Let $H$ be a Hopf algebra and $V$ a right $H$-module and right $H$-comodule. The module $V$ is a Yetter-Drinfeld module over $H$ if and only if \begin{align} ( v \triangleleft h_{(2)} )_{(0)} \otimes ...