Questions tagged [ag.algebraic-geometry]
for questions on algebraic geometry, including algebraic varieties, stacks, sheaves, schemes, moduli spaces, complex geometry, quantum cohomology.
16,277
questions
3
votes
1answer
60 views
Surjective étale morphisms étale locally split
The actual question is slightly more general than that in the title:
Let $p: U\to Y$ be a surjective étale morphism and $Y\to X$ be a finite morphism of schemes. Is there an étale cover $V\to X$ (...
3
votes
0answers
75 views
Bialynicki-Birula decomposition for singular projective variety
Let us have a (possibly singular) irreducible projective variety $X$ over $\mathbb{C}$, with an algebraic $\mathbb{C}^*$-action that has finitely many fixed points $\{x_1,\dots,x_n\}$. One can define ...
2
votes
0answers
95 views
Family of elliptic curves in $\mathbb P^3$
For points $p_1=[1,0,0,0], p_2=[0,1,0,0], p_3=[0,0,1,0]$, $p_4=[0,0,0,1]$ and $p_5=[1,1,1,1]$
in the projective space $\mathbb P^3$, Let $l_{ij}$ be the line through $p_i, p_j$.
Let
$$C=l_{12} \cup ...
0
votes
0answers
46 views
Two components on the moduli of stable maps $\overline{\mathcal{M}}_{2,0}(\mathbb{P}^1,3)$
I have two questions adapted from Exercise 24.3.1 in the book Mirror Symmetry.
Consider the moduli of stable maps $\overline{\mathcal{M}}_{2,0}(\mathbb{P}^1,3)$, where a typical element is a degree $...
0
votes
1answer
47 views
Slicker computation of the Lie algebra of the symplectic group (and computing differentials of matrix equations of polynomials)
Let $\mathbb{k}$ be an algebraically closed field. The symplectic algebraic group is given by
$$
\text{Sp}(2n,\mathbb{k})=\{M\in\text{Mat}_{2n}(\mathbb{k})\mid J=M^TJ M\}\quad\text{where}\quad J=\...
5
votes
0answers
168 views
An explicit description of $X(3)$ and its universal generalized elliptic curve
I'm struggling with the proof of 2.21 of Saito's "Fermat's Last Theorem".
Let $\omega$ be a primitive 3rd root of unity, $X(3) = \mathbb{P}^1_{\mathbb{Q}(\omega)}$, and $E = \{ X^3 + Y^3 + Z^3 - 3 \...
0
votes
0answers
181 views
When are the cotangent and tangent sheaves isomorphic?
Let $X$ be an $S$-scheme. Under what conditions, if any, is the cotangent sheaf $\Omega_{X/S}$ isomorphic to the tangent sheaf $\Theta_{X/S}$ as $\mathcal{O}_X$- modules? For example, given a ...
3
votes
0answers
41 views
Restriction of semistable sheaf to hyperplane of cover
Let $X$ be a smooth projective variety of dimension at least $2$ over $\mathbb{C}$. Let $\mathcal{O}_X(1)$ be a very ample line bundle and $E$ be a $\mu$-semistable sheaf on $X$. Then a theorem of ...
9
votes
0answers
227 views
Grothendieck categories and their morphisms
I am not an algebraic geometer in the first place, and I am mainly familiar with topology and category theory. Recently I am studying Grothendieck categories and I am struggling with getting ...
6
votes
0answers
137 views
Explicit construction of the Jacobian of a curve
Let $k$ be an algebraically closed field (of arbitrary characteristic), and $C$ a smooth projective curve over $k$, given by defining equations in projective space. I am looking for an algorithmic ...
0
votes
0answers
71 views
Understanding the Hasse-Weil Bound [closed]
While studying Number Theory, I recently encountered with the Hasse-Weil bound,but I know almost nothing about algebraic geometry, and so I don't think I fully understood it.
Does this statement have ...
3
votes
0answers
89 views
Where general mixed Galois representations are defined?
I am interested in etale cohomology of varieties, and respectively, in mixed $\mathbb Q_{\ell}$-adic Galois representations over finitely generated fields. What is the canonical reference for this ...
8
votes
0answers
105 views
Approximating zero sets of real polynomials with “less complicated” polynomials
Let $K \subset \mathbb{R}^n$ be a compact subset, and let $P(x_1,\dots,x_n)$ be a real multivariable polynomial of degree $d$, whose vanishing set we denote by $Z_P$. Is it plausible to approximate $...
14
votes
2answers
807 views
What is the precise relationship between pyknoticity and cohesiveness?
Pyknotic and condensed sets have been introduced recently as a convenient framework for working with topological rings/algebras/groups/modules/etc. Recently there has been much (justified) excitement ...
2
votes
1answer
158 views
Help with $\mathbf{Q}_{\ell}$ sheaves
Let $X\to S$ be a morphism of smooth connected varieties over an algebraically closed field $k$; let $j:\eta\to S$ be the inclusion of the generic point into $S$ (not a geometric generic point) and ...
-10
votes
0answers
62 views
37.5 is a 20% markup from which number? Explain how you found that number? [closed]
37.5 is a 20% markup from which number? Explain how you found that number?
7
votes
0answers
105 views
when the representation space is smooth manifold
In the context of Goldman's paper The symplectic nature of fundamental groups of surfaces:
Consider a closed oriented surface $S$ with fundamental group $\pi$, and let $G$ be a connected Lie group. ...
2
votes
0answers
53 views
$m$-regularity of sheaves
This is Lemma 1.4 on Green and Lazarsfeld's Some results on the syzygies of finite sets and algebraic curves. Let $X$ be a closed subscheme of $\mathbb{P}^r$. Suppose the ideal sheaf $\mathcal{I}$ of $...
-1
votes
1answer
94 views
Connections on vector bundles over elliptic curves - concrete computations
This is linked to my question on math.Stackexchange for which I had no answer.
I have found nowhere a historical account on connections (or rather called logarithmic connections?) that would help me ...
3
votes
0answers
111 views
Is cup product of cycle classes on Noetherian regular excellent scheme compatible with intersection
Let $\mathcal{X}$ be a Noetherian regular integral excellent scheme. Let $Y$ and $Z$ be algebraic cycles of codimension $c$ and $d$ on $\mathcal{X}$.
Let $n$ be a positive integer invertible on $\...
2
votes
3answers
249 views
Algebra of regular functions on the quadratic cone and SU(2) representations
I was reading the paper "Short Star-Products for Filtered Quantizations" by Pavel Etingof, were in the introduction he claims that the algebra of regular functions on the quadratic cone $X$ in $\...
4
votes
1answer
130 views
Which $p$-adic valuations of Weil numbers (that is, eigenvalues of Frobenius) are possible?
Let $C$ be a smooth projective curve over a finite field $\mathbb F_q$, $q$ is a power of the characteristic $p$. It is well-known that if $\alpha$ is an eigenvalue of Frobenius acting on $H^1_{et}(C,\...
2
votes
1answer
243 views
Ideal corresponding to the inverse image of a submanifold
I am currently learning about algebraic viewpoint on closed embedded sub(super)manifold. In particular, I am struggling with something which should be ''easy to see''. Namely, I refer to the lemma ...
1
vote
1answer
107 views
Are morphisms from affine schemes to Artin stacks affine morphisms?
It is explained in this MO discussion that if one has a morphism $f:X\rightarrow Y$ of schemes such that $X$ is an affine scheme, then $f$ need not be an affine morphism. However, if $Y$ is separated, ...
10
votes
1answer
234 views
Real manifolds and affine schemes
I noticed the following strange (to me) fact. If $M$ is a real manifold (smooth or not) and $R = C(X, \mathbb{R})$ is the ring of real functions (smooth functions in the smooth case) then the affine ...
0
votes
0answers
54 views
Existence of integral open subscheme with some nice properties
Let $R$ be a discrete valuation ring and $Spec(R):=S= \{\sigma, \eta\}$ it's affine scheme with closed point $\sigma$ and generic $\eta$. Let $f:Y \to S$ a dominant morphism of schemes of finite type. ...
1
vote
1answer
263 views
Why are Serre functors always exact?
Let $k$ be a field and $\mathcal{T}$ be a $k$-linear triangulated category with finite dimensional spaces of morphisms. Bondal and Kapranov proved that every Serre functor on $\mathcal{T}$ is exact (...
0
votes
0answers
50 views
Good reference on measure theory on Borel algebras of schemes
I am looking for a good reference on measure theory on Borel algebras of schemes, preferrably one that's available online since every library is in lockdown right now.
Any suggestions?
5
votes
0answers
247 views
Geometric interpretation of nonconnective, non-coconnective chain complexes / spectra?
Let's stipulate that
Connective -- i.e. nonnegatively-(homologically)-graded -- chain complexes have a very natural geometric interpretation: by the Dold-Kan theorem, they are a way of thinking about ...
2
votes
1answer
147 views
Picard group modulo codimension 2
Let $X$ be a normal (possibly singular) projective surface over $\mathbb{C}$. Consider the set $M_X$ of all coherent sheaves $F$ on $X$ such that there exists a finite subset $Y\subset X$ such that $F$...
2
votes
0answers
112 views
Smooth subvarieties through a singular point
Suppose that $X$ is a singular variety of dimension $n$, with singular locus of dimension $a$. Does there always exist a smooth subvariety $V$ of given dimension $m$ (where $a < m < n$) which ...
2
votes
1answer
178 views
Formal neighbourhood of a closed subscheme
Let $X$ be a variety and $Y \subset X$ a closed subvariety.
Edit: Assume they are both smooth.
Denote $N_{Y / X}$ the normal bundle of $Y$ in $X$. The formal neighbourhood of $Y$ in $X$ is the ...
3
votes
0answers
95 views
How to make algebraic dependence explicit
Here is a possibly standard question, from someone who is in no way an expert. The scenario is taken from Shafarevich, Basic Algebraic Geometry 1, ch. 1, §6.3, proof of Thm. 1.25(ii).
Let us have a ...
0
votes
0answers
47 views
The rotation angle of ellipse. Am I making a mistake? [closed]
we have the general formula $Ax^2+Bxy+Cy^2+Dx+Ey+F=0$.
The semi-major and semi-minor axes are $\sqrt{\frac{2(4ACF+BDE-AE^2-CD^2-FB^2)}{(B^2-4AC)(A+C+-\sqrt{(C-A)^2+B^2})}}$ using matrices and other ...
6
votes
1answer
162 views
Localization of symmetric monoidal categories and geometry
I have a series of vague questions, related to localization of symmetric monoidal categories.
Here is the context. Say we are working over a field of characteristic zero. Then the "one category ...
11
votes
1answer
305 views
De Rham and Koszul complexes
Consider the algebraic de Rham complex of the $n$-dimensional plane: this is merely
$$\ldots\rightarrow Sym(V^*)\otimes\bigwedge^{k}V^*\rightarrow Sym(V^*)\otimes\bigwedge^{k+1}V^*\rightarrow\ldots
$$...
3
votes
1answer
127 views
Translates of abelian subvarieties
Suppose $A$ is an abelian variety over an algebraically closed field $k$. I'm confused about the notion of translates of abelian subvarieties. I looked over a few related papers, but I couldn't find a ...
2
votes
0answers
103 views
A Lefschetz style formula for the $\ell^\infty$ torsion of an Abelian variety over a finite field
Let $A/\mathbb F_q$ be an abelian variety over a finite field. Define $A_\ell = A[\ell^\infty](\mathbb F_q)$, the $\ell^n$ ($n\geq 0)$ torsion points defined over the base field. I can assume $\ell \...
-1
votes
0answers
112 views
Is the scheme of morphism dense? [closed]
Let $X$ and $Y$ projectives algebraic varieties with $X \subset Y$ open and dense subset, then $Hom(\mathbb{P}^{1},X) \subset Hom(\mathbb{P}^{1},Y)$ is an open dense subset ? ($\mathbb{P}^{1}$ is a ...
3
votes
2answers
250 views
Is any constant Zariski sheaf already a Nisnevich sheaf?
Lat $A$ be a set and $\underline{A}$ the associated constant Zariski sheaf on the category $Sm/S$ of schemes which are smooth over $S$ for a fixed base scheme $S$. Is $\underline{A}$ already a (...
1
vote
1answer
82 views
isogenies between elliptic curves with multiplicative reduction
Let $ K $ be a $ p $-adic field. Suppose we have an isogeny of elliptic curves $ \phi : E \to E' $ defined over $ K $, where $ E $ and $ E' $ both have multiplicative reduction.
1) Is there anything ...
1
vote
0answers
81 views
The normal cone to a singular subvariety
Let $Y$ be a smooth variety, and let $X\subset Y$ be a subvariety. If $X$ is smooth, then $C_XY=N_XY$ is a quotient of $TY|_X$. Is the same still true if $X$ is singular? I.e. is there always a ...
7
votes
1answer
187 views
Finding $Q(\sqrt{-2})$-rational points on $X_0(33)$
Let $K = Q(\sqrt{-2})$. How can I compute the $K$-rational points on the modular curve $X_0(33)$?
Recall that $X_0(33)$ is of genus $3$ and has the following affine model,
$$y^2 +(-x^4-x^2-1)y = 2x^...
1
vote
0answers
115 views
Transcendance in function fields
Denote by $\Omega$ the completion of an algebraic closure of $\mathbb F_q\left(\!\left(\frac1T\right)\!\right)$ for the valuation $-\deg$. Let $(a_n)_n$ be a sequence of $\overline{\mathbb F_q(T)}\...
1
vote
0answers
162 views
Projective embeddings of quotients of normal varieties
Let $X$ be a normal complex projective variety of dimension $m$, $G$ be a finite subgroup of $\mathrm{Aut}(X)$, and $Y = X / G$ be the quotient. I am particularly interested in the case where $X$ is a ...
3
votes
0answers
145 views
Is the Cassels “$x - \theta$” map algebraic in some sense?
Setup: Let $k$ be a field of characteristic $0$, let $f(x) \in k[x]$ be a monic separable polynomial of degree $n \geq 4$, and let $\theta$ denote the image of $x$ under the map $k[x] \to K_f := k[x]/(...
2
votes
0answers
91 views
Morphism between jet spaces smooth
In this article "Introduction to Jet Schemes and Arc Spaces" S. Ishii introduces the spaces of $m$-jets:
Let $X$ be a variety over algebraically closed field $k$. The space $X_m$ of $m$-jets ...
1
vote
1answer
99 views
Is $\mathbb{Q}$-factoriality preserved under contraction?
Let ($X$,$\Delta$) be projective klt pair and $f \colon X \rightarrow Z$ be contraction of ($K_X + \Delta$) - negative extremal ray $R$.
If $X$ is $\mathbb{Q}$ -factorial and $\mathrm{dim}Z < \...
3
votes
0answers
81 views
Isomorphisms of weighted complete intersections
Let $X\subset\mathbb{P}(a_0,\dots,a_n)$ and $Y\subset\mathbb{P}(b_0,\dots,b_n)$ be two weighted complete intersections with mild (say terminal) singularities.
Assume that there is an isomorphism $f:...
3
votes
1answer
198 views
The Zariski topology of a variety is determined by its principal Cartier divisors
Let $X$ be a smooth separated integral variety over an algebraically closed field.
Question:
Is it true that a basis for the Zariski topology is given by the family $$\mathcal{U}=\{X\setminus \...
