Python ints are objects that encapsulate the actual number value. Out of curiosity / for fun I wondered: Can we mess with that value, for example setting the value of the object 1 to 2? So that 1 == 2 becomes True?
In Besse's "Einstein manifolds", p. 177, he states that, until that moment, no general classification of homogeneous Einstein manifolds was know, even in the compact case. More specifically, he poses a problem: classify the compact simply connected homogeneous manifolds $M=G/K$ which admit a $G$-...
Here is a basic Spinlock implemented with std::atomic_flag.
The author of the book claims that second while in the lock() boosts performance.
class Spinlock
{
std::atomic_flag flag{};
public:
void lock() {
while (flag.test_and_set(std::memory_order_acquire)) {
while (f...
I have written a small python3 program which finds files using glob. I also want to create a file with a listing of the found files and directories. However, for some reason, the with open only records the very first result.
Code:
for z in glob.glob("/home/example*", recursive=True):
if o...
Is the following problem known? Suppose one is given some of the entries of an $n \times n$ matrix $A$ over $\mathbb{R}$, so that the given entries are symmetric. Can one assign values to the remaining entries so that the resulting matrix is positive definite?
Has this problem been studied from a...
Let $X$ be a Banach space and let $\mathrm{Iso}(X)$ be its group of isometries, i.e., the set of surjective linear maps $T: X \to X$ with $\|Tx\| = \|x\|$.
Q: Is $\mathrm{Iso}(X)$ a topological group under the strong topology?
While it is easy to show that multiplication is continuous, it is not ...
I have a very simple snippet:
{-# LANGUAGE LinearTypes #-}
module Lib where
data Peer st = Peer { data :: String } deriving Show
data Idle
data Busy
sendToPeer :: Peer Idle %1-> Int -> IO (Peer Busy)
sendToPeer c n = case c of Peer d -> pure $ Peer d
I am on a resolver: ghc-9.0.1.
From the d...
I'm reading Avalonia source code and I came across this sentence:
return new MenuFlyoutPresenter
{
[!ItemsControl.ItemsProperty] = this[!ItemsProperty],
[!ItemsControl.ItemTemplateProperty] = this[!ItemTemplateProperty]
};
I've never seen a syntax ...
Given $x\in]0,1[$, let the function $f:\mathbb{N}^+\times\mathbb{N}\to\mathbb{R}$ be defined by
$$ f(p,q) := x p - q $$
Is there an analytic formula for the minimum of $f$ under the constraint
$$ f(p,q) > 0 $$
(together with $p$ being a positive integer and $q$ a nonnegative integer)?
Let $M$ be an irreducible 3-manifold with incompressible boundary of genus > 1.
When is $M$ homotopy equivalent to an Eilenberg-MacLane space? Or it is never true?