The morphism Spec R[x] --> Spec R
induced by the natural inclusion R --> R[x]
is an open map.
The main result is the first part of the statement of Lemma 00FB in the Stacks Project.
https://stacks.math.columbia.edu/tag/00FB
Given a polynomial f ∈ R[x]
, imageOfDf
is the subset of Spec R
where at least one
of the coefficients of f
does not vanish. Lemma imageOfDf_eq_comap_C_compl_zeroLocus
proves that imageOfDf
is the image of (zeroLocus {f})ᶜ
under the morphism
comap C : Spec R[x] → Spec R
.
Equations
- AlgebraicGeometry.Polynomial.imageOfDf f = {p : PrimeSpectrum R | ∃ (i : ℕ), Polynomial.coeff f i ∉ p.asIdeal}
Instances For
If a point of Spec R[x]
is not contained in the vanishing set of f
, then its image in
Spec R
is contained in the open set where at least one of the coefficients of f
is non-zero.
This lemma is a reformulation of exists_C_coeff_not_mem
.
The open set imageOfDf f
coincides with the image of basicOpen f
under the
morphism C⁺ : Spec R[x] → Spec R
.
The morphism C⁺ : Spec R[x] → Spec R
is open.
Stacks Project "Lemma 00FB", first part.
https://stacks.math.columbia.edu/tag/00FB