R.P.'s user avatar
R.P.'s user avatar
R.P.'s user avatar
R.P.
  • Member for 12 years, 6 months
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32 votes

Daunting papers/books and how to finally read them

16 votes

What are some ways to stay engaged with the mathematical community from outside academia?

1 vote

Most elementary proof showing that exponential growth wins against polynomial growth

7 votes

How can we solve the following number theory problem?

1 vote

Irreducibility of polynomials over some number fields

0 votes

Why do we make such big deal about the 'unsolvability' of the quintic?

17 votes

What to do after a pure math academic path?

2 votes

Rational solutions to $P(x,y)=0$ for $P$ reducible over ${\mathbb C}$

7 votes
Accepted

Square root in number field

1 vote

How to show an invariant subfield of rational function field $\mathbb{Q}(x)$ under a certain group action is actually a simple extension?

0 votes

Is pure mathematics useful outside of mathematics itself?

7 votes

Set of primes $p$ such that $\mathrm{Hom}(A, \mathbb{F}_p)=\emptyset$

2 votes

A road map through group cohomology

3 votes
Accepted

Diophantine approximation on spheres

2 votes

Diophantine approximation on spheres

8 votes
Accepted

Reference request: Diophantine equations

3 votes

Generalization of Weak Nullstellensatz?

6 votes

Conic sections are to cones as quadric surfaces are to what?

3 votes
Accepted

What is the state-of-the-art for solving polynomials systems over fields that are not algebraically closed?

13 votes

Finding $q(x)$ such that $p(q(x))$ is reducible over $\mathbb{Q}[x]$

5 votes

Singular models of K3 surfaces

18 votes

Results that are widely accepted but no proof has appeared

2 votes

Is there a name for sum of increases of f(x) on ranges where it's growing

6 votes
Accepted

Does the expression $x^4 +y^4$ take on all values in $\mathbb{Z}/p\mathbb{Z}$?

13 votes
Accepted

Diophantine representation of the set of prime numbers of the form $n²+1$

5 votes

Possible $p$-torsion subgroup of $E(\mathbb{Q}_p)$, and if there is a theorem to say which case happens when?

6 votes

Two queries on triangles, the sides of which have rational lengths

20 votes

$P(x)=P(y)$ has infinitely many integer solutions

2 votes

Contest problems with connections to deeper mathematics

4 votes

A curve is proper iff the space of global sections is finite-dimensional