12:07 AM
1

Following this, I obtain \sisetup{ range-phrase=ā } \SIrange{40}{50}{\liter} 40 Lā50 L Is there a way that can give me output in this format? 40ā50 L

3 hours later…
2:55 AM
1

Do Safe and Sophie Germain primes maintain a relatively stable distribution as numbers get larger, or do they become rarified beyond a predictable value? This is important in one area of triangular number comparison for some of my study. What is the predicatable, stable distribution? Is there a c...

1 hour later…
4:24 AM
2

By GCH I mean the Generalized Continuum Hypothesis. Let me give some context before presenting my question. When the axiom of choice was introduced by Zermelo in his 1904 proof of Well-Ordering Theorem, it generated a lot of controversy, and it had many critics. Nowadays, it is used almost freely...

3 hours later…
7:42 AM
2

Consider nice domain $D\subset \mathbb R^d$ and $\Delta u =0$ with $u\big|_{\partial D}=g$. It is well known that $u(x)=E^x[g(B(\tau))]$ where $\tau$ is exit time of $B$ from the domain $D$. What if we consider Neumann boundary conditions? Is there a stochastic representation?

4 hours later…
11:37 AM
1

I'm considering a new proof of Euler's formula, but I'm not confident if my method works. If $f(x+iy)= \cos(x)+i \sin(x)$, then we have $f_x/f=1$. Does it follow that $f(x+iy)=C \exp(x+ix)$ ? Since $f\overline{f}=1$, we could infer that $f(x+iy)= \exp(ix)$. EDIT: It was a typo to write $f_x/f=1$....

0

4 hours later…
3:54 PM
3

Let $K$ be a field and let $A$ be a $K$-algebra which is finite dimensional as $K$-vector space. Then the nice structure theorem for artinian rings says that we can write $A$ as the direct product of local $K$-algebras. Is there also a structure theorem for finitely generated modules over such $A... 3 hours later… 6:54 PM 3 In this discussion from the categories mailing there is mention of the following result by Robin Houston, supposedly proved in 2006: Theorem. Let$\mathcal{C}$be a symmetric closed monoidal category, and let$D$be an object. If there exists a natural isomorphism$f : A \rightarrow (A \multimap...

7:54 PM
2

Let $M$ be a von Neumann with separable predual. It well known that one can write $M$ as a direct sum $M=M_I\oplus M_{II} \oplus M_{III}$ of von Neumann algebras of types $I$, $II$ and $III$. It is also known that one can write $M$ as a direct integral of factors  M=\int_X^\oplus M(x) d\mu(x...