${\displaystyle \sum _{k=0}^{n}(-1)^{k}}$

37.162.46.235 (talk) 11:00, 4 December 2024 (UTC)[reply]

1 for n even, 0 for n odd. For ${\displaystyle n\to \infty }$ see Grandi's series. --Wrongfilter (talk) 11:18, 4 December 2024 (UTC)[reply]

I hope this is not homework. Note that (for finite ${\displaystyle n}$) this is a finite geometric series.  --Lambiam 21:51, 4 December 2024 (UTC)[reply]

The ghs attack involve creating an hyperlliptic curve cover for a given binary curve. The reason the attack fails most of the time is the resulting genus grows exponentially relative to the curve’s degree.

We don’t hear about the attack on finite fields of large characteristics since such curves are already secure by being prime. However, I notice a few protocol relies on the discrete logarithm security on curves with 400/500 bits modulus resulting from extension fields of characteristics that are 200/245bits long.

Since the degree is most of the time equal to 3 or 2, is there anything that would prevent creating suitable hyperelliptic cover for such curves in practice ? 2A01:E0A:401:A7C0:28FE:E0C4:2F97:8E08 (talk) 12:09, 6 December 2024 (UTC)[reply]

For each positive integer ${\displaystyle n}$, which primes ${\displaystyle p}$ are still primes in the ring ${\displaystyle Z[e^{\frac {\pi i}{n}}]}$? When ${\displaystyle n=1}$, ${\displaystyle Z[e^{\frac {\pi i}{n}}]}$ is the original integer ring, when ${\displaystyle n=2}$, ${\displaystyle Z[e^{\frac {\pi i}{n}}]}$ is the ring of Gaussian integers, when ${\displaystyle n=3}$, ${\displaystyle Z[e^{\frac {\pi i}{n}}]}$ is the ring of Eisenstein integers, and the primes in the Gaussian integers are the primes ${\displaystyle p\equiv 3\mod 4}$, and the primes in the Eisenstein integers are the primes ${\displaystyle p\equiv 2\mod 3}$, but how about larger ${\displaystyle n}$? 218.187.66.163 (talk) 04:50, 8 December 2024 (UTC)[reply]

A minuscule contribution: for ${\displaystyle n=4,}$ the natural Gaussian primes ${\displaystyle 3}$ and ${\displaystyle 7}$ are composite:

• ${\displaystyle 3=(1-\omega -\omega ^{2})(1+\omega ^{2}+\omega ^{3}).}$
• ${\displaystyle 7=(2-\omega +2\omega ^{2})(2-2\omega ^{2}-\omega ^{3}).}$

So ${\displaystyle 11}$ is the least remaining candidate.  --Lambiam 09:00, 8 December 2024 (UTC)[reply]

It is actually easy to see that ${\displaystyle 7}$ is composite, since ${\displaystyle 2}$ is a perfect square:

${\displaystyle 2=i(1-i)^{2}=\omega ^{2}(1-\omega ^{2})^{2}.}$

Hence, writing ${\displaystyle {\sqrt {2}}}$ by abuse of notation for ${\displaystyle \omega (1-\omega ^{2}),}$ we have:

${\displaystyle {\begin{alignedat}{2}7&=(3+{\sqrt {2}})(3-{\sqrt {2}})\\&=(2{\sqrt {2}}+1)(2{\sqrt {2}}-1)\\&=(5+3{\sqrt {2}})(5-3{\sqrt {2}})\\&=(4{\sqrt {2}}+5)(4{\sqrt {2}}-5).\end{alignedat}}}$

More in general, any natural number that can be written in the form ${\displaystyle |2a^{2}-b^{2}|,a,b\in \mathbb {N} ,}$ is not prime in ${\displaystyle \mathbb {Z} [e^{\pi i/4}].}$ This also rules out the Gaussian primes ${\displaystyle 23,}$ ${\displaystyle 31,}$ ${\displaystyle 47,}$ ${\displaystyle 71}$ and ${\displaystyle 79.}$  --Lambiam 11:50, 8 December 2024 (UTC)[reply]

So which primes ${\displaystyle p}$ are still primes in the ring ${\displaystyle Z[e^{\frac {\pi i}{4}}]}$? How about ${\displaystyle Z[e^{\frac {\pi i}{5}}]}$ and ${\displaystyle Z[e^{\frac {\pi i}{6}}]}$? 220.132.216.52 (talk) 06:32, 9 December 2024 (UTC)[reply]

As I wrote, this is only a minuscule contribution. We do not do research on command; in fact, we are actually not supposed to do any original research here.  --Lambiam 09:23, 9 December 2024 (UTC)[reply]

Moreover, ${\displaystyle -2}$ is also a perfect square. (As in the Gaussian integers, the additive inverse of a square is again a square.) So natural numbers of the form ${\displaystyle 2a^{2}+b^{2}}$ are also composite. This further rules out ${\displaystyle 11,}$ ${\displaystyle 19,}$ ${\displaystyle 43,}$ ${\displaystyle 59,}$ ${\displaystyle 67}$ and ${\displaystyle 83.}$ A direct proof that, e.g., ${\displaystyle 11}$ is composite: ${\displaystyle 11=(1+\omega ^{2}+3\omega ^{3})(1-3\omega -\omega ^{2}).}$ There are no remaining candidates below ${\displaystyle 100}$ and I can in fact not find any larger ones either. This raises the conjecture:

Every prime number can be written in one of the three forms ${\displaystyle a^{2}+b^{2},}$ ${\displaystyle 2a^{2}+b^{2}}$ and ${\displaystyle |2a^{2}-b^{2}|.}$

Is this a known theorem? If true, no number in ${\displaystyle \mathbb {Z} [e^{\pi i/4}]}$ is a natural prime. (Note that countless composite numbers cannot be written in any of these forms; to mention just a few: ${\displaystyle 15,1155,2491.}$)  --Lambiam 11:46, 9 December 2024 (UTC)[reply]

I'll state things a little more generally, in the cyclotomic field ${\displaystyle \mathbb {Q} [e^{2\pi i/n}]}$. (Your n is twice mine.) A prime q factors as ${\displaystyle q=(q_{1}\cdots q_{r})^{e_{r}}}$, where each ${\displaystyle q_{i}}$ is a prime ideal of the same degree ${\displaystyle f}$, which is the least positive integer such that ${\displaystyle q^{f}\equiv 1{\pmod {n}}}$. (We have assumed that q does not divide n, because if it did, then it would ramify and not be prime. Also note that we have to use ideals, because the cyclotomic ring is not a UFD.) In particular, ${\displaystyle q}$ stays prime if and only if ${\displaystyle q}$ generates the group of units modulo ${\displaystyle n}$. When n is a power of two times an odd composite, the group of units is not cyclic, and so the answer is never. When n is a prime or twice a prime, the answer is when q is a primitive root mod n. If n is 4 times a power of two times a prime, the answer is never. Tito Omburo (talk) 11:08, 8 December 2024 (UTC)[reply]

For your ${\displaystyle n}$, ${\displaystyle n=3}$ and ${\displaystyle n=6}$ are the same, as well as ${\displaystyle n=5}$ and ${\displaystyle n=10}$, this is why I use ${\displaystyle e^{\frac {\pi i}{n}}}$ instead of ${\displaystyle e^{\frac {2\pi i}{n}}}$. 61.229.100.34 (talk) 20:58, 8 December 2024 (UTC)[reply]

Also, what is the class number of the cyclotomic field ${\displaystyle Q[e^{\frac {\pi i}{n}}]}$? Let ${\displaystyle \gamma (n)}$ be the class number of the cyclotomic field ${\displaystyle Q[e^{\frac {\pi i}{n}}]}$, I only know that:

• ${\displaystyle \gamma (n)=1}$ for ${\displaystyle n=1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21,22,24,25,27,30,33,35,42,45}$ (is there any other such ${\displaystyle n}$)?
• If ${\displaystyle m}$ divides ${\displaystyle n}$, then ${\displaystyle \gamma (m)}$ also divides ${\displaystyle \gamma (n)}$, thus we can let ${\displaystyle \varphi (n)=\prod _{d|n}\gamma (n)^{\mu (n/d)}}$
• For prime ${\displaystyle p}$, ${\displaystyle p}$ divides ${\displaystyle \varphi (p)}$ if and only if ${\displaystyle p}$ is Bernoulli irregular prime
• For prime ${\displaystyle p}$, ${\displaystyle p}$ divides ${\displaystyle \varphi (2p)}$ if and only if ${\displaystyle p}$ is Euler irregular prime
• ${\displaystyle \varphi (n)=1}$ for ${\displaystyle n=1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21,22,24,25,27,30,33,35,42,45}$ (is there any other such ${\displaystyle n}$)?
• ${\displaystyle \varphi (n)}$ is prime for ${\displaystyle n=23,26,28,32,36,37,38,39,40,43,46,49,51,53,54,63,64,66,69,75,81,96,105,118,128,...}$ (are there infinitely many such ${\displaystyle n}$?)

Is there an algorithm to calculate ${\displaystyle \gamma (n)}$ quickly? 61.229.100.34 (talk) 21:14, 8 December 2024 (UTC)[reply]

Especially, is there an accepted term for such a pair?

Here are three simple examples, for two functions f,g, satisfying the above, and defined for every natural number:

Example #1:

f is constant.

Example #2:

f(x)=g(x), and is the smallest even number, not greater than x.

Example #3:

f(x)=1 if x is even, otherwise f(x)=2.

g(x)=x+2.

2A06:C701:746D:AE00:ACFC:490:74C3:660 (talk) 09:31, 8 December 2024 (UTC)[reply]

One way to consider such a pair is dynamically. If you consider the dynamical system ${\displaystyle x\mapsto g(x)}$, then the condition can be stated as "${\displaystyle f}$ is constant on ${\displaystyle g}$-orbits". More precisely, let ${\displaystyle D}$ be the domain of ${\displaystyle f,g}$, which is also the codomain of ${\displaystyle g}$. Define an equivalence relation on ${\displaystyle D}$ by ${\displaystyle x\sim y}$ if ${\displaystyle g^{a}(x)=g^{b}(y)}$ for some positive integers ${\displaystyle a,b}$. Then ${\displaystyle f}$ is simply a function on the set of equivalence classes ${\displaystyle D/\sim }$ (=space of orbits). In ergodic theory, such a function ${\displaystyle f}$ is thought of as an "observable" or "function of state", being the mathematical analog of a thermodynamic observable such as temperature. Tito Omburo (talk) 11:52, 8 December 2024 (UTC)[reply]

After you've mentioned temprature, could you explain what are f,g, as far as temprature is concerned? Additionally, could you give another useful example from physics for such a pair of functions? 2A06:C701:746D:AE00:ACFC:490:74C3:660 (talk) 19:49, 8 December 2024 (UTC)[reply]

This equation is just the definition of function g. For instance if function f has the inverse function f⁻¹ then we have g(x)=x. Ruslik_Zero 20:23, 8 December 2024 (UTC)[reply]

If f is the temperature, and g is the evolution of an ensemble of particles in thermal equilibrium (taken at a single time, say one second later), then because temperature is a function of state, one has ${\displaystyle f(x)=f(g(x))}$ for all ensembles x. Another example from physics is when ${\displaystyle g}$ is a Hamiltonian evolution. Then the functions ${\displaystyle f}$ with this property (subject to smoothness) are those that (Poisson) commute with the Hamiltonian, i.e. "constants of the motion". Tito Omburo (talk) 20:33, 8 December 2024 (UTC)[reply]

Thx. 2A06:C701:746D:AE00:ACFC:490:74C3:660 (talk) 10:43, 9 December 2024 (UTC)[reply]

Let ${\displaystyle f}$ be a function from ${\displaystyle X}$ to ${\displaystyle Y}$ and ${\displaystyle g}$ a function from ${\displaystyle X}$ to ${\displaystyle X.}$ Using the notation for function composition, the property under discussion can concisely be expressed as ${\displaystyle f\circ g=f.}$ An equivalent but verbose way of saying the same is that the preimage of any set ${\displaystyle B\subseteq Y}$ under ${\displaystyle f}$ is closed under the application of ${\displaystyle g.}$  --Lambiam 08:54, 9 December 2024 (UTC)[reply]

Thx. 2A06:C701:746D:AE00:ACFC:490:74C3:660 (talk) 10:43, 9 December 2024 (UTC)[reply]

I just found https://ieeexplore.ieee.org/abstract/document/6530387. Given the multiplicative group factorization in the underlying finite field of a target bn curve, they claim to acheive exponentiation inversion suitable for pairing inversion in seconds on a 32 bits cpu.

On 1 side, the paper is supposed to be peer reviewed by the iee Xplore journal and they give examples on 100 bits. On the other side, in addition to the claim, their algorithm 2 and 3 are very implicit, and as an untrained student, I fail to understand how to implement them, though I fail to understand things like performing a Weil descent.

Is the paper untrustworthy, or would it be possible to get code that can be run ? 2A01:E0A:401:A7C0:152B:F56C:F8A8:D203 (talk) 18:53, 8 December 2024 (UTC)[reply]

About the paper, I agree to share the paper privately 2A01:E0A:401:A7C0:152B:F56C:F8A8:D203 (talk) 18:54, 8 December 2024 (UTC)[reply]

If the Mersenne number 2^p-1 is prime, then must it be the smallest Mersenne prime == 1 mod p? (i.e. there is no prime q < p such that 2^q-1 is also a Mersenne prime == 1 mod p) If p is prime (no matter 2^p-1 is prime or not), 2^p-1 is always == 1 mod p. However, there are primes p such that there is a prime q < p such that 2^q-1 is also a Mersenne prime == 1 mod p:

• 2^19-1 is Mersenne prime == 1 mod 73 (p=73, q=19)
• 2^31-1 is Mersenne prime == 1 mod 151 (p=151, q=31)
• 2^61-1 is Mersenne prime == 1 mod 151 (p=151, q=61)
• 2^17-1 is Mersenne prime == 1 mod 257 (p=257, q=17)
• 2^31-1 is Mersenne prime == 1 mod 331 (p=331, q=31)
• 2^61-1 is Mersenne prime == 1 mod 331 (p=331, q=61)
• 2^127-1 is Mersenne prime == 1 mod 337 (p=337, q=127)
• 2^89-1 is Mersenne prime == 1 mod 353 (p=353, q=89)
• 2^89-1 is Mersenne prime == 1 mod 397 (p=397, q=89)

but for these primes p, 2^p-1 is not prime, and my question is: Is there a prime p such that 2^p-1 is a prime and there is a prime q < p such that 2^q-1 is also a Mersenne prime == 1 mod p?

• If 2^11-1 is prime, then this is true, since 2^11-1 is == 1 mod 31 and 2^31-1 is prime, but 2^11-1 is not prime
• If 2^23-1 or 2^67-1 is prime, then this is true, since 2^23-1 and 2^67-1 are == 1 mod 89 and 2^89-1 is prime, but 2^23-1 and 2^67-1 are not primes
• If 2^29-1 or 2^43-1 or 2^71-1 or 2^113-1 is prime, then this is true, since 2^29-1 and 2^43-1 and 2^71-1 and 2^113-1 are == 1 mod 127 and 2^127-1 is prime, but 2^29-1 and 2^43-1 and 2^71-1 and 2^113-1 are not primes
• If 2^191-1 or 2^571-1 or 2^761-1 or 2^1901-1 is prime, then this is true, since 2^191-1 and 2^571-1 and 2^761-1 and 2^1901-1 are == 1 mod 2281 and 2^2281-1 is prime, but 2^191-1 and 2^571-1 and 2^761-1 and 2^1901-1 are not primes
• If 2^1609-1 is prime, then this is true, since 2^1609-1 is == 1 mod 3217 and 2^3217-1 is prime, but 2^1609-1 is not prime

Another question: For any prime p, is there always a Mersenne prime == 1 mod p? 220.132.216.52 (talk) 19:03, 9 December 2024 (UTC)[reply]

Neither question is easy. For the first, relations ${\displaystyle 2^{q-1}\equiv 1{\pmod {p}}}$ would imply that the integer 2 is not a primitive root mod p, and that its order divides ${\displaystyle q-1}$ for the prime q. This is a sufficiently infrequent occurrence that it seems likely that all Mersenne numbers could be ruled out statistically, but not enough is known about their distribution. For the second, it is not even known if there are infinitely many Mersenne primes. Tito Omburo (talk) 19:23, 9 December 2024 (UTC)[reply]

I found that: 2^9689-1 is the smallest Mersenne prime == 1 mod 29, 2^44497-1 is the smallest Mersenne prime == 1 mod 37, 2^756839-1 is the smallest Mersenne prime == 1 mod 47, 2^57885161-1 is the smallest Mersenne prime == 1 mod 59, 2^4423-1 is the smallest Mersenne prime == 1 mod 67, 2^9941-1 is the smallest Mersenne prime == 1 mod 71, 2^3217-1 is the smallest Mersenne prime == 1 mod 97, 2^21701-1 is the smallest Mersenne prime == 1 mod 101, and none of the 52 known Mersenne primes are == 1 mod these primes p < 1024: 79, 83, 103, 173, 193, 197, 199, 227, 239, 277, 307, 313, 317, 349, 359, 367, 373, 383, 389, 409, 419, 431, 443, 461, 463, 467, 479, 487, 503, 509, 523, 547, 563, 587, 599, 613, 647, 653, 659, 661, 677, 709, 727, 733, 739, 743, 751, 757, 769, 773, 797, 809, 821, 823, 827, 829, 839, 853, 857, 859, 863, 887, 907, 911, 919, 929, 937, 941, 947, 971, 977, 983, 991, 1013, 1019, 1021 220.132.216.52 (talk) 20:51, 9 December 2024 (UTC)[reply]

Also,

• 2^19937-1 is Mersenne prime == 1 mod 2^16+1
• 2^521-1 is Mersenne prime == 1 mod 2^13-1
• 2^3021377-1 is Mersenne prime == 1 mod 2^17-1
• 2^2281-1 is Mersenne prime == 1 mod 2^19-1
• 2^21701-1 is Mersenne prime == 1 mod 2^31-1
• 2^19937-1 is Mersenne prime == 1 mod 2^89-1
• 2^86243-1 is Mersenne prime == 1 mod 2^107-1

but none of these primes p has 2^p-1 is known to be prime, the status of 2^(2^89-1)-1 and 2^(2^107-1)-1 are still unknown (see double Mersenne number), but if at least one of them is prime, then will disprove this conjecture (none of the 52 known Mersenne primes are == 1 mod 2^61-1 or 2^127-1), I think that this conjecture may be as hard as the New Mersenne conjecture. 220.132.216.52 (talk) 20:55, 9 December 2024 (UTC)[reply]

Also, for the primes p < 10000, there is a prime q < p such that 2^q-1 is also a Mersenne prime == 1 mod p only for p = 73, 151, 257, 331, 337, 353, 397, 683, 1321, 1613, 2113, 2731, 4289, 4561, 5113, 5419, 6361, 8191, 9649 (this sequence is not in OEIS), however, none of these primes p have 2^p-1 prime. 220.132.216.52 (talk) 02:23, 10 December 2024 (UTC)[reply]

Above I posed:

Conjecture. Every prime number can be written in one of the three forms ${\displaystyle a^{2}+b^{2},}$ ${\displaystyle 2a^{2}+b^{2}}$ and ${\displaystyle |2a^{2}-b^{2}|.}$

If true, it implies no natural prime is a prime in the ring ${\displaystyle \mathbb {Z} [e^{\pi i/4}]}$.

The absolute-value bars are not necessary. A number that can be written in the form ${\displaystyle -(2a^{2}-b^{2})}$ is also expressible in the form ${\displaystyle +(2a^{2}-b^{2}).}$

It turns out (experimentally; no proof) that a number that can be written in two of these forms can also be written in the third form. The conjecture is not strongly related to the concept of primality, as can be seen in this reformulation:

Conjecture. A natural number that cannot be written in any one of the three forms ${\displaystyle a^{2}+b^{2},}$ ${\displaystyle 2a^{2}+b^{2}}$ and ${\displaystyle 2a^{2}-b^{2}}$ is composite.

The first few numbers that cannot be written in any one of these three forms are

${\displaystyle 15,}$ ${\displaystyle 21,}$ ${\displaystyle 30,}$ ${\displaystyle 35,}$ ${\displaystyle 39,}$ ${\displaystyle 42,}$ ${\displaystyle 55,}$ ${\displaystyle 60,}$ ${\displaystyle 69,}$ ${\displaystyle 70,}$ ${\displaystyle 77,}$ ${\displaystyle 78,}$ ${\displaystyle 84,}$ ${\displaystyle 87,}$ ${\displaystyle 91,}$ ${\displaystyle 93,}$ ${\displaystyle 95.}$

They are indeed all composite, but why this should be so is a mystery to me. What do ${\displaystyle 2310=2\times 3\times 5\times 7\times 11,}$ ${\displaystyle 5893=71\times 83}$ and ${\displaystyle 7429=17\times 19\times 23,}$ which appear later in the list, have in common? I see no pattern.

It seems furthermore that the primorials, starting with ${\displaystyle 5\#=30,}$ make the list. (Checked up to ${\displaystyle 37\!\#=7420738134810.}$)  --Lambiam 19:23, 10 December 2024 (UTC)[reply]

Quick note, for those like me who are curious how numbers of the form ${\displaystyle -(2a^{2}-b^{2})}$ can be written into a form of ${\displaystyle 2a^{2}-b^{2}}$, note that ${\displaystyle 2a^{2}-b^{2}=(2a+b)^{2}-2(a+b)^{2}}$, and so ${\displaystyle 2a^{2}-b^{2}=-p\Rightarrow p=2(a+b)^{2}-(2a+b)^{2}}$. GalacticShoe (talk) 02:20, 11 December 2024 (UTC)[reply]

A prime is expressible as the sum of two squares if and only if it is congruent to ${\displaystyle 1\!\!\!{\pmod {4}}}$, as per Fermat's theorem on sums of two squares. A prime is expressible of the form ${\displaystyle 2a^{2}+b^{2}}$ if and only if it is congruent to ${\displaystyle 1,3\!\!{\pmod {8}}}$, as per OEIS:A002479. And a prime is expressible of the form ${\displaystyle 2a^{2}-b^{2}}$ if and only if it is congruent to ${\displaystyle 1,7\!\!{\pmod {8}}}$, as per OEIS:A035251. Between these congruences, all primes are covered. GalacticShoe (talk) 05:59, 11 December 2024 (UTC)[reply]

More generally, a number is not expressible as:

1. ${\displaystyle a^{2}+b^{2}}$ if it has a prime factor congruent to ${\displaystyle 3\!\!\!{\pmod {4}}}$ that is raised to an odd power (equivalently, ${\displaystyle 3,7\!\!{\pmod {8}}}$.)
2. ${\displaystyle 2a^{2}+b^{2}}$ if it has a prime factor congruent to ${\displaystyle 5,7\!\!{\pmod {8}}}$ that is raised to an odd power
3. ${\displaystyle 2a^{2}-b^{2}}$ if it has a prime factor congruent to ${\displaystyle 3,5\!\!{\pmod {8}}}$ that is raised to an odd power

It is easy to see why expressibility as any two of these forms leads to the third form holding, and also we can see why it's difficult to see a pattern in numbers that are expressible in none of these forms, in particular we get somewhat-convoluted requirements on exponents of primes in the factorization satisfying congruences modulo 8. GalacticShoe (talk) 06:17, 11 December 2024 (UTC)[reply]

Thanks. Is any of this covered in some Wikipedia article?  --Lambiam 10:06, 11 December 2024 (UTC)[reply]

All primes? 2 is not covered! 176.0.133.82 (talk) 08:00, 17 December 2024 (UTC)[reply]

${\displaystyle 2}$ can be written in all three forms: ${\displaystyle 2=1^{2}+1^{2}=2\cdot 1^{2}+0^{2}=2\cdot 1^{2}-0^{2}.}$  --Lambiam 09:38, 17 December 2024 (UTC)[reply]

I don't say it's not covered by the conjecture. I say it's not covered by the discussed classes of remainders. 176.0.133.82 (talk) 14:54, 17 December 2024 (UTC)[reply]

Odd prime, my bad. GalacticShoe (talk) 16:38, 17 December 2024 (UTC)[reply]

Assume p is 3 mod 4. Suppose that (2|p)=1. Then ${\displaystyle x^{4}+1\equiv (x^{2}+\lambda x+1)(x^{2}-\lambda x+1){\pmod {p}}}$ where ${\displaystyle \lambda ^{2}-2\equiv 0}$. Because the cyclotomic ideal ${\displaystyle (p,\zeta ^{2}+\lambda \zeta +1)}$ has norm ${\displaystyle p^{2}}$ and is stable under the Galois action ${\displaystyle \zeta \mapsto 1/\zeta }$ it is generated by a single element ${\displaystyle a\zeta ^{2}+b\zeta +a}$, of norm ${\displaystyle (2a^{2}-b^{2})^{2}}$.

If (2|p)=-1, then the relevant ideal is stable under ${\displaystyle \zeta \mapsto -1/\zeta }$ and so is generated by ${\displaystyle a\zeta ^{2}+b\zeta -a}$, of norm ${\displaystyle (2a^{2}+b^{2})^{2}}$. Tito Omburo (talk) 14:43, 11 December 2024 (UTC)[reply]

So I'm supposed to know the answer to this, I suppose, but I don't seem to :-)

"Everyone knows" that, in ${\displaystyle L[U]}$, Gödel's constructible universe relative to an ultrafilter ${\displaystyle U}$ on some measurable cardinal ${\displaystyle \kappa }$, there is only a single normal ultrafilter, namely ${\displaystyle U}$ itself. See for example John R. Steel's monograph here, at Theorem 1.7.

So I guess that must mean that the product measure ${\displaystyle U\times U}$, meaning you fix some identification between ${\displaystyle \kappa \times \kappa }$ and ${\displaystyle \kappa }$ and then say a set has measure 1 if measure 1 many of its vertical sections have measure 1, must not be normal. (Unless it's somehow just equal to ${\displaystyle U}$ but I don't think it is.)

But is there some direct way to see that? Say, a continuous function ${\displaystyle f:\kappa \to \kappa }$ with ${\displaystyle \forall \alpha f(\alpha )<\alpha }$ such that the set of fixed points of ${\displaystyle f}$ is not in the ultrafilter no singleton has a preimage under ${\displaystyle f}$ that's in the ultrafilter? I haven't been able to come up with it. --Trovatore (talk) 06:01, 11 December 2024 (UTC)[reply]

I recently completed a calculus term, in which one of the last units involving how much one aspect of an object was changing in relation to time at a certain point, given the rate of change of another aspect. Many specific questions could be analyzed as a right triangle with one leg (the x) remaining constant and the other leg (the y) growing at a specified rate. When it came time to solve for the value of the dz/dt (the rate of the hypotenuse’s growth with respect to time) at a certain point, it ended up as less than the provided dy/dt. Here’s an illustration:

The x is the distance from me to a tower. This remains constant.

The y is the distance from the tower to a flying bird.

The dy/dt is the speed at which the bird is flying from the tower.

The z is my distance from the bird.

In this illustration, the distance between me and the bird is increasing at a slower rate than the speed at which the bird itself is flying. What is the cause of this paradox? Primal Groudon (talk) 19:43, 15 December 2024 (UTC)[reply]

I do not see any paradox here. Ruslik_Zero 20:30, 15 December 2024 (UTC)[reply]

If the bird is between you and the tower (0 ≤ y < x), the distance between you and the bird is even decreasing: dz/dt < 0. By the time it flies right overhead (y = x), the distance is momentarily stationary: dz/dt = 0. After that, it increases: dz/dt > 0. This rate of increase will asymptotically approach dy/dt from below as the bird flies off into an infinite distance.  --Lambiam 00:34, 16 December 2024 (UTC)[reply]

I think the issue here is that even though the rate of change of z is less than the rate of change of y, z never actually becomes less than y. You can see this graphically, for example, by comparing the graphs of y=x and y=√(x²+1). The second graph is always above the first graph, but the slope of the first graph is x/√(x²+1), which is always less than 1, the slope of the first graph. But this is typical behavior when a graph has an asymptote. As a simpler example, the slope of 1/x is negative, but the value never goes below 0 (at least for x>0). Similarly, the slope of x+1/x is always less than 1, but the value of x+1/x is always greater than x (again, for x>0). The graph of y=√(x²+1) is one branch of a hyperbola having y=x as an asymptote, and this looks very much like the x>0 part of y=x+1/x. In general the difference in rates of change can imply that that two quantities get closer and closer to each other, but this does not mean they ever become equal. This phenomenon is, perhaps, counterintuitive for many people, but the math says it can happen anyway. I don't know if this rises to the level of a paradox, but I can see that it might be concerning for some. --RDBury (talk) 09:39, 16 December 2024 (UTC)[reply]

For x > 0, the graph of y=√(x²+1) looks even more like that of y=x+1/(2x). For example, when x = 5, √(x²+1) = √26 ≈ 5.09902 is approximated much more closely by 5.1 than by 5.2.  --Lambiam 18:35, 16 December 2024 (UTC)[reply]