# All Questions

0answers
9 views

### Random processes with smooth paths

Is there any prototypical example of a Random process with smooth paths? I imagine one can simple integrate each path of a Brownian motion and get a $C^{\frac32-\epsilon}$ path. It's easy to ...
0answers
4 views

### Fixed point shape property

Question: Provide (or prove that it's not possible) a metric compact space which has the fixed point property but not the fixed point shape property. Here is the definition of f.p.s.p.("map" means ...
0answers
45 views

### Atiyah-Guillemin-Sternberg Theorem for current

The Atiyah-Guillemin-Sternberg theorem says that the image of a moment map of a toric action is independent of the choice of symplectic form in the cohomology class. So all is well for the smooth ...
1answer
75 views

### Completing class-sized Fields

Let's say that an ordered Field is a class (proper or not) which satisfies the axioms of ordered fields. We work in NBG set theory with global choice. Let's say that an ordered Field is real closed ...
2answers
159 views

### Nice way to express $H^{-1}(\mathbb{S}^1)$

I am looking for a good way to write down what $H^{-1}(\mathbb{S}^1)$ is. What do I mean by this: Well, certainly one can define this space via charts that map from the sphere into $\mathbb{R}^2$ and ...
0answers
15 views

### Linear transformation from n-dimensinal vector space to Rn [on hold]

Suppose: U is a real n-dimensional vector space, and B = {$u_1$, $u_2$,...,$u_n$} be a basis for U, let $T: U \to R^n$ be the linear transformation defined by $$T(u) = [u]_B$$ How to prove: ...
0answers
21 views

2answers
1k views

### Mathematicians with Aphantasia (Inability to Visualize Things in One's Mind)

Are there any mathematicians with aphantasia? If so, could they please elaborate upon what their experience with mathematics is like? I realize that this question probably falls outside of the scope ...
2answers
291 views

### Lattice n-gons with ordered side lengths 1,2,3,…,n

Consider the octagon in the Cartesian plane with vertices at (0,0), (1,0), (1,2), (4,2), (4,6), (7,2), (7,8), and (0,8). Are there other (infinitely many) polygons, such as this, lying entirely in ...

15 30 50 per page