Questions tagged [projective-morphisms]
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6 questions with no upvoted or accepted answers
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Generalized Euler sequence on a projective scheme
Let $\mathcal{E}$ be a quasi-coherent sheaf on a scheme $S$. Consider the projective scheme $p : \mathbb{P}(\mathcal{E}) \to S$ and the canonical epimorphism $p^*(\mathcal{E}) \to \mathcal{O}_{\mathbb{...
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Jacobian Conjecture, Cubic-Keller maps
I have recently read an interesting article about the Jacobian Conjecture, in particular the reduction to the case $f(x) = x + A(x)^3$.
I was wondering about codimension one divisors on $Y = A^n$. ...
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Projectivization of cokernel of 2-term-Koszul-like morphism depends only on certain simple data?
Let $X$ be a scheme and $D \subset X$ an effective Cartier divisor on $X$. For any line bundle ${\mathcal L} \in \mathrm{Pic}(X)$ and any global section $s \in \Gamma(X,{\mathcal L})$, define
$$ Y({\...
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Extension of a rational section of a projective bundle
Let us assume that we work over the complex field and let $X$ be a smooth projective variety and $\pi: P \to X$ a projective bundle (i.e. a fibration in projective spaces of constant dimension). Let $...
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Cohomology of a stratified projective bundle
Let $S$ be a smooth algebraic variety, and suppose $X\to S$ is a smooth morphism of schemes such that the geometric fibers are all projective spaces. Let us suppose that the dimension of the fibers is ...
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The morphisms induced by two Cartier divisors
Let X be a projective variety. We consider two Cartier divisors $D,E$ such that $E\geq D$ and the relative morphisms
$\phi_D: X - - -> \mathbb{P}(H^0(X, O_X(D))^*)$ and $\phi_E: X- - -> \mathbb{...