Small group number 249 of order 64

G is the group 64gp249

The Hall-Senior number of this group is 109.

G has 4 minimal generators, rank 3 and exponent 8. The centre has rank 1.

There are 3 conjugacy classes of maximal elementary abelian subgroups. Their ranks are: 3, 3, 3.

This cohomology ring calculation is complete.

Ring structure | Completion information | Koszul information | Restriction information | Poincaré series

Ring structure

The cohomology ring has 6 generators:

y₁ in degree 1, a nilpotent element
y₂ in degree 1
y₃ in degree 1
y₄ in degree 1
u in degree 5
r in degree 8, a regular element

There are 5 minimal relations:

y₁² = 0
y₂.y₄² = y₂².y₄ + y₁.y₃²
y₁.y₃².y₄² = y₁.y₃⁴ + y₁.y₂.y₃².y₄ + y₁.y₂².y₃²
y₁.u = 0
u² = y₂.y₃⁸.y₄ + y₂⁵.y₃⁴.y₄ + y₁.y₃⁸.y₄ + y₁.y₂⁶.y₃².y₄

A minimal Gröbner basis for the relations ideal consists of this minimal generating set, together with the following redundant relation:

y₁.y₂.y₃⁴ = y₁.y₂³.y₃²

Completion information

This cohomology ring was obtained from a calculation out to degree 12. The cohomology ring approximation is stable from degree 10 onwards, and Benson's tests detect stability from degree 12 onwards.

This cohomology ring has dimension 3 and depth 2. Here is a homogeneous system of parameters:

h₁ = r in degree 8
h₂ = y₄⁴ + y₃².y₄² + y₃⁴ + y₂.y₃².y₄ + y₂².y₃² + y₂³.y₄ + y₂⁴ in degree 4
h₃ = y₄ + y₃ in degree 1

The first 2 terms h₁, h₂ form a regular sequence of maximum length.

The first term h₁ forms a complete Duflot regular sequence. That is, its restriction to the greatest central elementary abelian subgroup forms a regular sequence of maximal length.

Data for Benson's test:

Raw filter degree type: -1, -1, 9, 10.
Filter degree type: -1, -2, -3, -3.
α = 0
The system of parameters is very strongly quasi-regular.
The regularity conjecture is satisfied.

Koszul information

A basis for R/(h₁, h₂, h₃) is as follows.

1 in degree 0
y₃ in degree 1
y₂ in degree 1
y₁ in degree 1
y₃² in degree 2
y₂.y₃ in degree 2
y₂² in degree 2
y₁.y₃ in degree 2
y₁.y₂ in degree 2
y₃³ in degree 3
y₂².y₃ in degree 3
y₂³ in degree 3
y₁.y₃² in degree 3
y₁.y₂.y₃ in degree 3
y₁.y₂² in degree 3
y₂³.y₃ in degree 4
y₂⁴ in degree 4
y₁.y₃³ in degree 4
y₁.y₂².y₃ in degree 4
y₁.y₂³ in degree 4
u in degree 5
y₂⁴.y₃ in degree 5
y₁.y₂³.y₃ in degree 5
y₁.y₂⁴ in degree 5
y₃.u in degree 6
y₂.u in degree 6
y₁.y₂⁴.y₃ in degree 6
y₃².u in degree 7
y₂.y₃.u in degree 7
y₂².u in degree 7
y₃³.u in degree 8
y₂².y₃.u in degree 8
y₂³.u in degree 8
y₂³.y₃.u in degree 9
y₂⁴.u in degree 9
y₂⁴.y₃.u in degree 10

A basis for Ann_{R/(h₁, h₂)}(h₃) is as follows.

y₁.y₃².h + y₁.y₂.y₃.h + y₁.y₂².h + y₁.y₂.h² in degree 4
y₁.y₃³.h + y₁.y₂.y₃².h + y₁.y₂².y₃.h + y₁.y₂.y₃.h² in degree 5
y₁.y₂³.h + y₁.y₂.h³ in degree 5
y₁.y₂³.y₃.h + y₁.y₂.y₃.h³ in degree 6
y₁.y₂⁴.h + y₁.y₂².h³ in degree 6
y₁.h⁵ in degree 6
y₁.y₂⁴.y₃.h + y₁.y₂².y₃.h³ in degree 7
y₁.y₃.h⁵ in degree 7
y₁.y₂.h⁵ in degree 7
y₁.y₂.y₃.h⁵ in degree 8
y₁.y₂².h⁵ in degree 8
y₁.y₂².y₃.h⁵ in degree 9

Restriction information

Restriction to special subgroup number 1, which is 2gp1

y₁ restricts to 0
y₂ restricts to 0
y₃ restricts to 0
y₄ restricts to 0
u restricts to 0
r restricts to y⁸

Restriction to special subgroup number 2, which is 8gp5

y₁ restricts to 0
y₂ restricts to 0
y₃ restricts to y₃
y₄ restricts to y₂
u restricts to 0
r restricts to y₁².y₂².y₃⁴ + y₁².y₂⁴.y₃² + y₁⁴.y₃⁴ + y₁⁴.y₂².y₃² + y₁⁴.y₂⁴ + y₁⁸

Restriction to special subgroup number 3, which is 8gp5

y₁ restricts to 0
y₂ restricts to y₂
y₃ restricts to y₃
y₄ restricts to 0
u restricts to 0
r restricts to y₁².y₂².y₃⁴ + y₁².y₂⁴.y₃² + y₁⁴.y₃⁴ + y₁⁴.y₂².y₃² + y₁⁴.y₂⁴ + y₁⁸

Restriction to special subgroup number 4, which is 8gp5

y₁ restricts to 0
y₂ restricts to y₃
y₃ restricts to y₂
y₄ restricts to y₃
u restricts to y₂².y₃³ + y₂⁴.y₃
r restricts to y₂.y₃⁷ + y₂⁵.y₃³ + y₂⁷.y₃ + y₁².y₂².y₃⁴ + y₁².y₂⁴.y₃² + y₁⁴.y₃⁴ + y₁⁴.y₂².y₃² + y₁⁴.y₂⁴ + y₁⁸

Poincaré series

(1 + 3t + 5t² + 6t³ + 5t⁴ + 3t⁵ + t⁶) / (1 - t) (1 - t⁴) (1 - t⁸)

Back to the groups of order 64