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6 votes
1 answer
574 views

Is decomposability of integer polynomials over the rational numbers an undecidable problem?

By a decomposition of a polynomial $F(x)$ over a field $K$ we mean writing $F(x)$ as $$ F(x)=G(H(x)) \quad(G(x), H(x) \in K[x]), $$ which is nontrivial if $\operatorname{deg} G(x)>1$ and $\...
SARTHAK GUPTA's user avatar
1 vote
0 answers
69 views

Hasse principle for Brauer groups of fields of transcendence degree 2

In his paper "A Hasse principle for function fields over PAC fields" (DOI link), Ido Efrat proves the following result: Let $F$ be an extension of a perfect PAC field $K$ of relative ...
aspear's user avatar
  • 41
3 votes
0 answers
132 views

Galois cohomology and Levi subgroups

Let $F$ a field and $G$ a smooth connected reductive group with a Levi subgroup $M$. Under what assumptions is $H^1(F, M) \to H^1(F, G)$ injective? In the case $F$ is nonarchimedean local I believe ...
C.D.'s user avatar
  • 605
2 votes
0 answers
121 views

Polynomial discriminant equation

This is a fairly straightforward question, and I am hoping a definitive answer exists. Does there exist a quadratic form $A \in \mathbb{C}[x_1, x_2, x_3, x_4]$ and a cubic form $B \in \mathbb{C}[x_1, ...
Stanley Yao Xiao's user avatar
2 votes
0 answers
94 views

Galois representations attached to discrete automorphic representations

Let $F$ be a totally real field. Let $G$ be a (split) connected reductive group over $F$. Let $\pi$ be an irreducible automorphic representation of $G$. Recall in the work of Buzzard and Gee "The ...
Zhiyu's user avatar
  • 6,622
1 vote
0 answers
265 views

Are there connections between Calabi-Yau manifolds and number theory?

I am interested in understanding whether there are any significant connections between Calabi-Yau manifolds and number theory. Calabi-Yau manifolds are central objects in algebraic geometry and string ...
Abdullah M Al-jazy's user avatar
4 votes
0 answers
87 views

Levis, parabolics and Bruhat-Tits over Henselian local rings

Let $(R,m)$ be a Henselian local ring with algebraically closed or finite residue field $k$ and fraction field $F$. For example, we may work with $R=W(\mathbb F_p^{alg})$. The paper "Reductive ...
Zhiyu's user avatar
  • 6,622
2 votes
1 answer
126 views

Changing the weight space for an eigenvariety

Let $G$ be an algebraic group (like $\operatorname{GL}_2$ or $\operatorname{GL}_2 \times\operatorname{GL}_2$ for example). Assume that there exists an eigenvariety $\mathcal{E}^G$ parameterizing ...
BanAna's user avatar
  • 93
4 votes
0 answers
81 views

Classification of nilpotent orbits over local fields (for type ABCD via partitions )

Let $\mathfrak g$ be a simple Lie algebra over a char $0$ local field $F$ (e.g. $F=\mathbb R$ or $F=\mathbb Q_p$) with its adjoint group $G$. Let $\mathcal N \subseteq \mathfrak g$ be its nilpotent ...
Zhiyu's user avatar
  • 6,622
3 votes
0 answers
165 views

Are motives of K3 surfaces of abelian type?

I refer to the article of van Geemen https://arxiv.org/pdf/math/9903146. What van Geemen calls the Kuga-Satake-Hodge conjecture suggests that for a K3 surface $X$ over $\mathbb{C}$, the summand $h^2(X)...
Vik78's user avatar
  • 658
5 votes
1 answer
260 views

Central isogeny, Shimura varieties and exceptional cases

For a simple complex Lie algebra $\mathfrak g$, its weight lattice is not equal to the root lattice (i.e. the center of its simply connected form is a non-trivial finite group) iff $\mathfrak g$ is of ...
Zhiyu's user avatar
  • 6,622
3 votes
0 answers
147 views

Tate conjecture for singular varieties in terms of intersection homology

In his book “Mixed motives and algebraic K-theory”, Jannsen generalizes the Tate conjecture to a potentially singular projective variety $X$ over a finitely generated field. The statement is the same ...
Vik78's user avatar
  • 658
2 votes
3 answers
181 views

Stabilizers of the action of Levi on abelianization of nilpotent radical

$\DeclareMathOperator\Lie{Lie}$Let $G$ be a simple connected reductive group over $\mathbb C$. Consider a parabolic subgroup $P=MU$ of $G$, where $M$ is a Levi of $P$ and $U$ is the unipotent radical ...
Zhiyu's user avatar
  • 6,622
1 vote
0 answers
182 views

"Reflex field" for $\mathbb H/\Gamma$ for $\Gamma$ non-congruence

Suppose $\Gamma$ is a non-congruence arithmetic subgroup of $PGL_2(\mathbb Z)$, and $\mathbb H$ is the upper half plane of $\mathbb C$. Then by Belyi's theorem we know $\mathbb H/\Gamma$ is an ...
Richard's user avatar
  • 775
1 vote
0 answers
78 views

Invariant theory (first fundamental theorem) for a direct sum of two fundamental representations

Let $G$ be a simple reductive group over $\mathbb C$, e.g. $G=\mathrm{SO}(V)$ is a special orthogonal group. Let $W_1$ and $W_2$ be two irreducible representations of $G$. Assume both $W_i$ are ...
Zhiyu's user avatar
  • 6,622
1 vote
0 answers
146 views

Can we find curves with many rational points using linear algebra?

Probably this is impossible, but let us try. Working over $\mathbb{Q}[x_1,...,x_n]$. Let $T_i$ be $n$ sets of rationals with cardinality $B$. Assume we are given $n-2$ linear equations $f_i$ which are ...
joro's user avatar
  • 25.4k
5 votes
0 answers
251 views

Does a simple formal group give rise to a simple Lie algebra?

A formal group $F$ is an intermediate object between Lie group $G$ and Lie algebra $\mathfrak{g}$. A formal group is called simple if it has no nontrivial sub-formal group. On the other hand, a simple ...
Learner's user avatar
  • 195
6 votes
1 answer
407 views

Good reduction for the universal elliptic curve

Let $X$ be a modular curve, i.e. a quotient of the upper half plane $\mathbb{H}$ by a congruence subgroup $\Gamma$. When $\Gamma=\Gamma_0(N)$, it is known that $X$ has a smooth model denoted $\mathcal{...
kindasorta's user avatar
  • 2,907
3 votes
0 answers
150 views

$p$-adic points of open subschemes of complete intersections

I'm currently studying the $3\times 3$ magic square of squares problem for a research project. The variety is initially given by the intersection of $8$ quadrics in $\mathbb{P}^8$, but via Gröbner ...
Ben Singer's user avatar
2 votes
0 answers
91 views

Adelic description of moduli of stable vector bundle of rank n (over finite fields)?

Let $Bun_G$ be the moduli stack of $G$-bundles on a (geometrically irreducible smooth projective) curve $C$ over a finite field $k$, where $G$ is a split reductive group over $k$. Since Weil, we know ...
Zhiyu's user avatar
  • 6,622
1 vote
0 answers
64 views

Existence of a special uniformizer along a smooth section of a prestable curve

Let $R$ be a complete DVR with fraction field $K$, uniformizer $\pi$ and alg. closed residue field $k$. Let $f : X\rightarrow \text{Spec }R$ be a prestable model of $\mathbb{P}^1_K$ with a $R$-section ...
stupid_question_bot's user avatar
1 vote
1 answer
140 views

Specialization of points on the generic fiber in a prestable model of $\mathbb{P}^1$

Let $R$ be a complete DVR with uniformizer $\pi$, fraction field $K$ and residue field $k$. We assume $k$ is algebraically closed. Let $X$ be a prestable model of $\mathbb{P}^1_K$ over $R$, so $X$ is ...
stupid_question_bot's user avatar
8 votes
0 answers
401 views

Langlands program in higher dimensions

We can view the Langlands program in each of its versions (local/global, arithmetic/geometric) as giving a description of the finite-dimensional representations of the étale fundamental group of a ...
Mira's user avatar
  • 91
1 vote
0 answers
114 views

Simultaneous elimination of variables in multiple polynomials

I have a system of $n=O(1)$ non-homogeneous polynomials of total degree $d=O(1)$ $p_1,\dots,p_r\in \mathbb Z[x_1,\dots,x_n]$. I would like to eliminate $n-1$ variables simultaneously from the $n$ ...
Turbo's user avatar
  • 13.9k
5 votes
1 answer
236 views

Methods of finding integer solutions beyond the reach of direct search

Consider a classical problem: given a polynomial Diophantine equation $P(x_1,\dots,x_n)=0$, determine whether it has an integer solution. While this problem is undecidable in general, we may still ...
Bogdan Grechuk's user avatar
5 votes
1 answer
363 views

Unramified fppf cohomology

Let $F$ be a number field, $\mathcal{O}_F$ its ring of integers and $G$ an fppf $\mathcal{O}_F$-group scheme. See the question Unramified Galois cohomology of number fields for unramified cohomology ...
Joseph Harrison's user avatar
2 votes
0 answers
88 views

Conjecture on ordinary reductions of smooth complex projective varieties and Its context

I am interested in the conjecture suggesting that many reductions of a smooth complex projective variety are ordinary, as mentioned in Remark 5.1 of the paper by Mustaţă and Srinivas: Ordinary ...
Thomas Bitoun's user avatar
1 vote
0 answers
87 views

Equidistribution of Frobenius Classes

Let $G$ be a reductive group over $\mathbb{Q}$. Let $K$ be a maximal compact subgroup of $G(\mathbb{C})$. Let $S$ be a finite set of primes. For each prime $p$ not in $S$, let $Frob_p$ be a conjugacy ...
Kledin Dobi's user avatar
2 votes
0 answers
168 views

When do we have $\bigoplus_{i + j = n} R^i f_* \mathbb{Q}_\ell \otimes_{\mathbb{Q}_\ell} R^j g_* \mathbb{Q}_\ell \cong R^{i + j} h_* \mathbb{Q}_\ell$?

Milne, Étale Cohomology, theorem 8.5 states the following version of the Künneth formula (in slightly greater generality). Let $\Lambda$ be a finite commutative ring. Let $X, Y, S$ be schemes with $S$ ...
Bma's user avatar
  • 531
3 votes
2 answers
284 views

Definition of $M_{1,0}$

Is there an explicit construction of the moduli space $M_{1,0}/\mathbb{Q}$ of genus $1$ curves whose set of $R$-points, for a $\mathbb{Q}$-algebra $R$, is the set of isomorphism classes of genus $1$-...
kindasorta's user avatar
  • 2,907
3 votes
1 answer
411 views

Twists of elliptic curves

I have a few questions regarding twists of elliptic curves. In the context of the Shafarevich group, I see people refer to the group of twists of an elliptic curve $E/\mathbb{Q}$ by $H^1(\mathbb{Q}, ...
kindasorta's user avatar
  • 2,907
0 votes
0 answers
54 views

Functional equations with coupled arguments and additive sructure

Let $G$ be a locally compact abelian group and let $f: G \to \mathbb{R}^+$ be a continuous function satisfying the functional equation $$f(x + \phi(y)) + f(y + \phi(x)) = 1 + f(x+y)$$ for all $x, y \...
Chandler Halderson's user avatar
7 votes
0 answers
124 views

Projections of closed geodesics under the modular function

In the answers to this question it was shown that for closed geodesics on $\mathbb{H}^2/\Gamma(2)$, the projection under the modular function $\lambda$ is an immersed topological component of a real ...
Ian Agol's user avatar
  • 68.9k
6 votes
0 answers
338 views

Deeper meaning behind the occurrence of the factor $\frac{\log q}{i}$ in Deninger's results

In two papers Deninger proved the following: If $q=p^{n}$ and $p$ is a finite prime of $\mathbb{Z}$, $B=\mathbb{C}[\mathbb{C}]$ is generated by symbols of the form $e^{\alpha}$, $\alpha\in\mathbb{C}$,...
The Thin Whistler's user avatar
2 votes
0 answers
120 views

Looking at versions of Implicit Function Theorem (IFT) on rings

$ \let \ovr \overline \def \Z {\mathbb Z} \def \C {\mathbb C} \def \F {\mathbb F} \def \P {\mathcal P} \def \x {\boldsymbol x} \def \a {\boldsymbol a} $ Let $ \P = \{ p _ i ( \x , y ) \} _ { i = 1 } ^ ...
Mohsen Shahriari's user avatar
2 votes
0 answers
171 views

A conjecture on the scheme-theoretic image of a moduli map

Let $K/\mathbb{Q}_p$ be a finite extension with residue field $k$, and let $K'/K$ be a finite tamely ramified Galois extension with residue field $k'$. Let $E/\mathbb{Q}_p$ be a sufficiently large ...
Ricardo Nunez's user avatar
10 votes
2 answers
286 views

Finding a model for $X_G$ with $G\subseteq \mathrm{GL}_2(\mathbb{Z}/N\mathbb{Z})$

I'm studying modular curves as part of my doctorate work and would like to understand how one gets from a subgroup $G$ of $\operatorname{GL}_2(\mathbb{Z}/N\mathbb{Z})$ to an equation for $X_G$. By $...
Camilo Gallardo's user avatar
1 vote
0 answers
88 views

Identification of different components of Hilbert modular surface?

I'm wondering whether the different components of the Hilbert modular surface can be (naturally?) identified with each other, or if they're at least abstractly isomorphic. (I'd also be interested in ...
xir's user avatar
  • 2,044
4 votes
0 answers
100 views

Structure of points of elliptic curves in field with restricted ramification

Let $k$ be a finite field of characteristic $p$ and let $C$ be a curve over $k$. Let $E$ be a non-constant elliptic curve over $k(C)$. Taking the Néron model of $E$ and removing the singular fibers ...
Victor de Vries's user avatar
7 votes
2 answers
617 views

Genus 0 curves on surfaces and the abc conjecture

One of the most obvious methods to prove that a given Diophantine equation $P(x_1, \dots, x_n)=0$ has infinitely many integer solutions is to find polynomials $P_1, \dots, P_n$ in one variable $u$, ...
Bogdan Grechuk's user avatar
4 votes
1 answer
470 views

To what extent do value sets determine polynomials mod p?

Let $f$ denote a polynomial mod $p$ and associate to it its value set $S_{f} := \{f(x):x \in F_p\}$. If $|S_{f}|=p$ then $f$ is called a permutation polynomial (because it permutes the elements of $...
Mark Lewko's user avatar
7 votes
3 answers
348 views

The rank of elliptic curves and related quadratic twists

Let $E/\mathbb{Q}$ be an elliptic curve, and let $k_1, k_2$ be square-free integers. Can anything be said about the related elliptic curves $$\displaystyle E/\mathbb{Q}, E^{(k_1)}/\mathbb{Q}, E^{(k_2)}...
Stanley Yao Xiao's user avatar
5 votes
0 answers
234 views

Triviality of $\unicode{1064}(T_pE ⊗ T_pE)$ for elliptic curves and Bogomolov's lemma

Consider the case of an elliptic curve $E$ over Q, and let $S$ be a finite set of primes including all places of bad reduction and a place $p$ of good reduction. Bogomolov's Lemma says that when $p$ ...
kindasorta's user avatar
  • 2,907
13 votes
3 answers
1k views

$\ell$- vs. $p$-adic and de Rham vs. Betti in the geometric Langlands correspondence

In Emerton–Gee–Hellmann’s IHÉS notes on the categorical $p$-adic local Langlands programme, one finds the following remark: The differences between the $\ell$-adic and $p$-adic settings are ...
coLaideronnette's user avatar
2 votes
1 answer
150 views

Closure of specialization of points of an affine group scheme with smooth generic fiber

Let $R$ be a henselian discrete valuation ring with residue field $k$, and let $G$ be an affine faithfully-flat finite type group scheme over $R$ with smooth generic fiber. Let $R'$ be the ring of ...
stupid_question_bot's user avatar
1 vote
0 answers
127 views

Does the torsion points of abelian varieties transfer to their formal group laws (upon suitable choice of coordinates)?

Let $A$ and $B$ be two abelian varieties over any algebraically closed field. Let $A[p^n]$ and $B[p^n]$ denotes the set of $p$-power torsion points of $A$ and $B$. Assume that $A[p^n]$ and $B[p^n]$ ...
Learner's user avatar
  • 195
4 votes
0 answers
111 views

Group structure on $\mathbb{Z}$-points of an algebraic torus over $\mathbb{Z}[1/N]$

Consider the affine conic $C\subset\mathbb{A}^2_\mathbb{Z}$ cut out by $x^2 + axy + y^2 + b$, where $a,b\in\mathbb{Z}$. Assume that $a\ne \pm 2$, and that $C$ admits an integral point $(x_0,y_0)$. The ...
stupid_question_bot's user avatar
3 votes
2 answers
342 views

Reference Request: Beilinson-Bloch conjecture in terms of Beilinson regulator isomorphism

I'm looking for a reference that provides a concise statement of the Beilinson-Bloch conjecture, specifically formulated in terms of an isomorphism under the Beilinson regulator map. More precisely, I'...
kindasorta's user avatar
  • 2,907
1 vote
0 answers
137 views

Syntomic f-cohomology for open varieties

Syntomic cohomology $H^{i+j}_{\mathrm{syn}}(X,n)$ of a proper variety $X$ with good reduction over a $p$-adic field $K$ is computed via a spectral sequence in terms of $H^i_{\mathrm{f}}(G_K;H^j_{\...
David Corwin's user avatar
  • 15.4k
27 votes
8 answers
3k views

Object of proven finiteness, yet with no algorithm discovered?

I explain my title by two examples in number theory: The rational points on elliptic curve over number fields forms a finitely generated abelian group, so its rank is an integer, but so far we do not ...
J.Li's user avatar
  • 1,053

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