Is it true that in the category of connected smooth manifolds equipped with a compatible field structure (all six operations are smooth) there are only two objects (up to isomorphism) - $\mathbb{R}$ and $\mathbb{C}$?
If $\xi$ denotes the Riemann xi function, then define for $|z|<1$, $$\phi(z):=\xi\left(\frac{1}{1-z}\right)$$
Question: If $0\leq r<1$ , then is the following limit finite? $$\lim_{r\to 1^-}\oint_{|z|=r}\frac{\phi'(z)}{\phi(z)}dz$$
We have,
$\frac{\phi'(z)}{\phi(z)}=\frac{\xi'\left(\frac{1}{1-...
I have started my code and am on at a very good start, however, I have come to a road block when it comes to adding sum, average, minimum, and maximum to my code, I'm sure this is a pretty easy fix to someone who knows what there are doing. Any help would be greatly appreciated. The numbers in my...
I am trying to consume data from a callback API that sends the POST request in this format:
[
{
"key1": "asd",
"key2": "123"
}
]
However my API currently only works when it is sent like this:
{
"key1": "asd",
"key2": "123"
}
serializers.py:
class RawIncomingDataSerializer(serial...
Suppose that we are given an AF-algebra $A$ and a sequence of finite-dimensional subalgebras $\mathbb{C}=A_0\subset A_1\subset A_2\subset\ldots$ such that $A=\overline{\bigcup\limits_{n\geq 0}A_n}$. Let me denote this dense subalgebra of $A$ by $A^{LS}$, i.e. $A^{LS}= \bigcup\limits_{n\geq 0}A_n$...
In python, I can write something like this:
some_list = [(1, 2, 3), (3, 2, 1)]
for i, *args in some_list:
print(args)
I will get the next output:
[2, 3]
[2, 1]
When we use *args as function arguments, it is unpacked into a tuple.
Why do we receive a list in this situation?