User Vesselin Dimitrov

9 votes

1 answer

290 views

Which domain maximizes the energy of the Lebesgue measure?

asked May 21, 2015 at 14:25

9 votes

0 answers

423 views

A characterization of quadratics similar to an inverse sieve problem

asked Nov 17, 2015 at 18:03

9 votes

2 answers

554 views

The mean value of $y \log{y}$ over the ordinates of the CM points

asked Jun 27, 2017 at 8:27

9 votes

0 answers

341 views

Is this a possible strengthening of the Lehmer conjecture?

asked Nov 6, 2018 at 17:01

9 votes

0 answers

413 views

Number fields ordered by discriminant

asked Nov 15, 2018 at 0:58

9 votes

0 answers

267 views

How small may the discriminant of an $S_d$-field be?

asked Feb 12, 2019 at 16:28

8 votes

0 answers

224 views

Is there an approximate formula for the discriminant of a sparse polynomial?

asked Sep 28, 2018 at 15:18

8 votes

1 answer

331 views

Angular distribution of zero sets of sparse polynomials

asked Oct 3, 2015 at 2:39

8 votes

0 answers

217 views

Attractors of arithmetically small points

asked Oct 17, 2015 at 20:30

8 votes

0 answers

357 views

Does Stepanov's method extend to complete intersections?

asked Mar 29, 2016 at 0:39

8 votes

0 answers

510 views

A refinement of Lehmer's conjecture?

asked Aug 22, 2013 at 20:59

8 votes

0 answers

288 views

Are the Chern numbers of a hyperbolic-type compact complex manifold bounded in terms of the Euler number?

asked Feb 9, 2013 at 11:43

8 votes

0 answers

503 views

Points of minimum Arakelov height and harmonic arithmetical varieties

asked Feb 9, 2013 at 14:25

8 votes

0 answers

516 views

How many curves in a family possess a rational point?

asked Feb 7, 2013 at 18:22

8 votes

1 answer

465 views

The critical exponent in the multiplicative order of 2 modulo primes

asked Mar 2, 2013 at 2:00

8 votes

3 answers

2k views

When are isotrivial families split by a finite base-change?

asked Jul 24, 2014 at 19:09

7 votes

0 answers

203 views

No intermediate denominators growth for holonomic functions?

asked Mar 6, 2020 at 1:52

6 votes

0 answers

135 views

Diophantine approximation in $\mathbb{G}_m^r$ with approximants restricted to a finiteley generated subgroup

asked Sep 22, 2014 at 0:19

6 votes

1 answer

357 views

The angular distribution of the $(a,b)$ in $p = a^2+b^2$, and the distribution of the lattices corresponding to prime ideals

asked Sep 22, 2014 at 5:41

6 votes

3 answers

341 views

Clustering of periodic points for a polynomial iteration of $\mathbb{C}$

asked Oct 26, 2014 at 2:58

6 votes

1 answer

546 views

Generalizations of de Franchis and function field Mordell

asked Jul 8, 2014 at 0:13

6 votes

0 answers

219 views

Extremal polynomial majorants of $\log{|f|}$: a multivariate extension of a theorem of Carneiro and Vaaler

asked Sep 2, 2018 at 14:56

6 votes

2 answers

360 views

The kernel of a nef line bundle

asked Sep 17, 2017 at 1:48

5 votes

2 answers

327 views

The largest disk contained by a 'product' of two simply connected plane regions with unit conformal radii

asked Mar 22, 2018 at 15:43

5 votes

0 answers

195 views

What are the possible $L^{\infty}$ closures of an integration-invariant linear subspace of $C([0,1],\mathbb{R})$?

asked Apr 6, 2018 at 14:24

5 votes

1 answer

156 views

Extremal functions for the 'packing density in dimension one'

asked Oct 8, 2016 at 0:24

5 votes

0 answers

197 views

On effective constructions in the functional analysis of Volterra's integration operator

asked Jul 15, 2018 at 17:10

5 votes

0 answers

251 views

On the multiplicative order of 2 mod primes - II

asked Dec 27, 2013 at 18:05

5 votes

1 answer

747 views

Generalization of "Hadamard quotient theorem" to higher genus and positive equicharacteristic?

asked Aug 24, 2013 at 18:42

5 votes

1 answer

455 views

May a globally bounded G-function have a logarithmic branching? (On a conjecture of Ruzsa)

asked Aug 9, 2013 at 11:12

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75 Questions

Which domain maximizes the energy of the Lebesgue measure?

A characterization of quadratics similar to an inverse sieve problem

The mean value of $y \log{y}$ over the ordinates of the CM points

Is this a possible strengthening of the Lehmer conjecture?

Number fields ordered by discriminant

How small may the discriminant of an $S_d$-field be?

Is there an approximate formula for the discriminant of a sparse polynomial?

Angular distribution of zero sets of sparse polynomials

Attractors of arithmetically small points

Does Stepanov's method extend to complete intersections?

A refinement of Lehmer's conjecture?

Are the Chern numbers of a hyperbolic-type compact complex manifold bounded in terms of the Euler number?

Points of minimum Arakelov height and harmonic arithmetical varieties

How many curves in a family possess a rational point?

The critical exponent in the multiplicative order of 2 modulo primes

When are isotrivial families split by a finite base-change?

No intermediate denominators growth for holonomic functions?

Diophantine approximation in $\mathbb{G}_m^r$ with approximants restricted to a finiteley generated subgroup

The angular distribution of the $(a,b)$ in $p = a^2+b^2$, and the distribution of the lattices corresponding to prime ideals

Clustering of periodic points for a polynomial iteration of $\mathbb{C}$

Generalizations of de Franchis and function field Mordell

Extremal polynomial majorants of $\log{|f|}$: a multivariate extension of a theorem of Carneiro and Vaaler

The kernel of a nef line bundle

The largest disk contained by a 'product' of two simply connected plane regions with unit conformal radii

What are the possible $L^{\infty}$ closures of an integration-invariant linear subspace of $C([0,1],\mathbb{R})$?

Extremal functions for the 'packing density in dimension one'

On effective constructions in the functional analysis of Volterra's integration operator

On the multiplicative order of 2 mod primes - II

Generalization of "Hadamard quotient theorem" to higher genus and positive equicharacteristic?

May a globally bounded G-function have a logarithmic branching? (On a conjecture of Ruzsa)