# Grassmannian.info

A periodic table of (generalised) Grassmannians.

## Symplectic Grassmannian $\SGr(5,14)$

Basic information
dimension
35
index
10
Euler characteristic
672
Betti numbers
$\mathrm{b}_{ 0 } = 1$, $\mathrm{b}_{ 2 } = 1$, $\mathrm{b}_{ 4 } = 2$, $\mathrm{b}_{ 6 } = 3$, $\mathrm{b}_{ 8 } = 5$, $\mathrm{b}_{ 10 } = 7$, $\mathrm{b}_{ 12 } = 9$, $\mathrm{b}_{ 14 } = 12$, $\mathrm{b}_{ 16 } = 15$, $\mathrm{b}_{ 18 } = 19$, $\mathrm{b}_{ 20 } = 22$, $\mathrm{b}_{ 22 } = 26$, $\mathrm{b}_{ 24 } = 29$, $\mathrm{b}_{ 26 } = 33$, $\mathrm{b}_{ 28 } = 35$, $\mathrm{b}_{ 30 } = 38$, $\mathrm{b}_{ 32 } = 39$, $\mathrm{b}_{ 34 } = 40$, $\mathrm{b}_{ 36 } = 40$, $\mathrm{b}_{ 38 } = 39$, $\mathrm{b}_{ 40 } = 38$, $\mathrm{b}_{ 42 } = 35$, $\mathrm{b}_{ 44 } = 33$, $\mathrm{b}_{ 46 } = 29$, $\mathrm{b}_{ 48 } = 26$, $\mathrm{b}_{ 50 } = 22$, $\mathrm{b}_{ 52 } = 19$, $\mathrm{b}_{ 54 } = 15$, $\mathrm{b}_{ 56 } = 12$, $\mathrm{b}_{ 58 } = 9$, $\mathrm{b}_{ 60 } = 7$, $\mathrm{b}_{ 62 } = 5$, $\mathrm{b}_{ 64 } = 3$, $\mathrm{b}_{ 66 } = 2$, $\mathrm{b}_{ 68 } = 1$, $\mathrm{b}_{ 70 } = 1$
$\mathrm{Aut}^0(\SGr(5,14))$
$\mathrm{PSp}_{ 14 }$
$\pi_0\mathrm{Aut}(\SGr(5,14))$
$1$
$\dim\mathrm{Aut}^0(\SGr(5,14))$
105
Projective geometry
minimal embedding

$\SGr(5,14)\hookrightarrow\mathbb{P}^{ 1637 }$

degree
55861712194928640
Hilbert series
1, 1638, 606424, 88558848, 6692914008, 307734304878, 9574750099915, 217185532621200, 3792871276494300, 53144161362386640, 616890699447789312, 6085082653719560192, 52065157341637101312, 392972003262026926416, 2653279275162936265092, 16214870061133265906384, 90590476949809599958965, 466655595805762692132650, 2232818012626903234533000, 9986937523659386690400000, ...
Exceptional collections

No full exceptional collection is known for $\mathbf{D}^{\mathrm{b}}(\SGr(5,14))$. Will you be the first to construct one? Let us know if you do!

Kuznetsov–Polishchuk have constructed an exceptional collection of maximal length in MR3463417. Can you prove it's full?

Quantum cohomology

The small quantum cohomology is not known to be (non-)semisimple.

The big quantum cohomology is not known yet to be generically semisimple.

The eigenvalues of quantum multiplication by $\mathrm{c}_1(\SGr(5,14))$ are given by:

Homological projective duality