Fanography

A tool to visually study the geography of Fano 3-folds.

Identification

Fano variety 8-1

$\mathbb{P}^1\times\mathrm{Bl}_6\mathbb{P}^2$

Picard rank
8
$-\mathrm{K}_X^3$
18
$\mathrm{h}^{1,2}(X)$
0
Hodge diamond and polyvector parallelogram
1
0 0
0 8 0
0 0 0 0
0 8 0
0 0
1
1
0 3
0 4 4
0 0 12 12
0 0 0
0 0
0
Anticanonical bundle
index
1
$\dim\mathrm{H}^0(X,\omega_X^\vee)$
12
$-\mathrm{K}_X$ very ample?
yes
$-\mathrm{K}_X$ basepoint free?
yes
hyperelliptic
no
trigonal
yes
Birational geometry

This variety is rational.


This variety is the blowup of

  • 7-1, in a curve of genus 0

This variety can be blown up (in a curve) to

  • 9-1, in a curve of genus 0
Deformation theory
number of moduli
4
Bott vanishing
does not hold
$\mathrm{Aut}^0(X)$ $\dim\mathrm{Aut}^0(X)$ number of moduli
$\mathrm{PGL}_2$ 3 4
Period sequence

The following period sequences are associated to this Fano 3-fold:

GRDB
#155
Fanosearch
#45
Extremal contractions

$\mathbb{P}^1$-bundle over $\mathrm{Bl}_6\mathbb{P}^2$, for the vector bundle $\mathcal{O}_{\mathrm{Bl}_6\mathbb{P}^2}\oplus\mathcal{O}_{\mathrm{Bl}_6\mathbb{P}^2}$.

Semiorthogonal decompositions

A full exceptional collection can be constructed using Orlov's blowup formula.

Structure of quantum cohomology

Generic semisimplicity of:

  • small quantum cohomology, proved by Ciolli in 2005, see [MR2168069] , using the description of quantum cohomology of a $\mathbb{P}^1$-bundle
Zero section description

Fano 3-folds from homogeneous vector bundles over Grassmannians gives the following description(s):

variety
$\mathbb{P}^3 \times \mathbb{P}^1$
bundle
$\mathcal{O}(3,0)$

See the big table for more information.

K-stability
  • none are K-stable
  • every member is K‑polystable
  • every member is K‑semistable
See and the big table for more information.