Small group number 742 of order 128

G is the group 128gp742

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

There are 3 conjugacy classes of maximal elementary abelian subgroups. Their ranks are: 3, 3, 4.

This cohomology ring calculation is complete.

Ring structure

The cohomology ring has 14 generators:

• y₁ in degree 1
• y₂ in degree 1
• y₃ in degree 1
• x₁ in degree 2, a nilpotent element
• x₂ in degree 2, a nilpotent element
• x₃ in degree 2
• x₄ in degree 2
• w in degree 3
• u₁ in degree 5
• u₂ in degree 5
• u₃ in degree 5
• t₁ in degree 6, a nilpotent element
• t₂ in degree 6, a nilpotent element
• r in degree 8, a regular element

There are 53 minimal relations:

• y₂.y₃ = 0
• y₁.y₃ = 0
• y₁.y₂ = 0
• y₃.x₃ = y₁.x₄
• y₃.x₂ = y₃.x₁
• y₂.x₂ = 0
• y₁.x₁ = 0
• y₃.w = x₂.x₄
• y₁.w = x₂.x₃
• x₂² = 0
• x₁.x₂ = 0
• x₁² = 0
• y₁.x₄² = y₁.x₃.x₄
• x₂.w = 0
• w² = x₃.x₄² + x₃².x₄ + y₂.u₁ + y₂.x₄.w + y₂.x₃.w + x₂.x₄² + x₁.x₄² + x₁.x₃.x₄ + y₂.x₁.w
• y₃.u₃ = y₃.u₁ + x₂.x₃.x₄ + y₃⁴.x₁
• y₃.u₂ = y₃².x₁.x₄ + y₃⁴.x₁
• y₂.u₃ = y₂².x₃.x₄ + x₂.x₄² + x₂.x₃.x₄ + x₁.x₄² + x₁.x₃.x₄ + y₂².x₁.x₄ + y₂⁴.x₁
• y₂.u₂ = y₂².x₃.x₄ + x₁.x₃.x₄ + x₁.x₃² + y₂².x₁.x₄ + y₂².x₁.x₃
• y₁.u₃ = y₁².x₂.x₃
• y₁.u₁ = x₂.x₃.x₄
• x₄.u₂ = x₃.u₃ + y₂.x₃.x₄² + y₂.x₃².x₄ + y₁.x₃².x₄ + y₃.x₁.x₄² + y₃³.x₁.x₄ + y₂.x₁.x₄² + y₂³.x₁.x₃ + y₁.x₂.x₃²
• x₂.u₃ = y₃.t₁ + y₃³.x₁.x₄ + y₃⁵.x₁
• x₂.u₂ = y₁.t₂ + y₁³.x₂.x₃
• x₂.u₁ = y₃.t₁ + y₃³.x₁.x₄ + y₃⁵.x₁
• x₁.u₃ = y₃.t₁ + y₃³.x₁.x₄ + y₃⁵.x₁ + y₂.x₁.x₃.x₄
• x₁.u₂ = y₂.x₁.x₃.x₄
• x₁.u₁ = x₁.x₃.w + y₃.t₁ + y₃³.x₁.x₄ + y₃⁵.x₁ + y₂.t₂ + y₂.t₁ + y₂.x₁.x₄² + y₂.x₁.x₃.x₄ + y₂.x₁.x₃² + y₂³.x₁.x₄ + y₂⁵.x₁
• x₁.x₄.w = x₁.x₃.w + y₂.t₂ + y₂.x₁.x₃.x₄ + y₂².x₁.w + y₂³.x₁.x₃
• y₃.t₂ = y₃.t₁ + y₃.x₁.x₄²
• y₁.t₁ = 0
• w.u₃ = y₂.x₃.x₄.w + x₄.t₂ + x₂.x₄³ + x₂.x₃².x₄ + x₁.x₃.x₄² + y₃².x₁.x₄² + y₃⁴.x₁.x₄ + y₂².x₁.x₃.x₄ + y₂³.x₁.w
• w.u₂ = y₂.x₃.x₄.w + x₃.t₂ + x₂.x₃².x₄ + x₁.x₃².x₄ + y₂.x₁.x₃.w + y₂².t₂ + y₂².x₁.x₃.x₄ + y₂².x₁.x₃² + y₂³.x₁.w + y₂⁴.x₁.x₃ + y₁².x₂.x₃²
• x₂.t₂ = 0
• x₂.t₁ = 0
• x₁.t₂ = 0
• x₁.t₁ = 0
• x₃.x₄.u₃ = x₃².u₃ + y₂.x₃².x₄² + y₂.x₃³.x₄ + w.t₂ + x₁.x₃².w + y₂.x₄.t₁ + y₂.x₃.t₁ + y₂.x₁.x₄³ + y₂.x₁.x₃.x₄² + y₂.x₁.x₃².x₄ + y₂.x₁.x₃³ + y₂³.t₂ + y₂³.t₁ + y₂³.x₁.x₃² + y₂⁵.x₁.x₃ + y₂⁷.x₁ + y₁.x₂.x₃³
• u₃² = y₃.x₄².u₁ + y₂².x₃².x₄² + x₂.x₄⁴ + y₃².x₄.t₁ + y₃².x₁.x₄³ + y₃².r
• u₂.u₃ = y₂².x₃².x₄² + y₃².x₄.t₁ + y₃⁴.t₁ + y₃⁴.x₁.x₄² + y₃⁸.x₁ + y₂.w.t₂ + y₂.x₁.x₃².w + y₂².x₄.t₁ + y₂².x₃.t₁ + y₂².x₁.x₄³ + y₂².x₁.x₃².x₄ + y₂².x₁.x₃³ + y₂⁴.t₂ + y₂⁴.t₁ + y₂⁶.x₁.x₃ + y₂⁸.x₁ + y₁².x₃.t₂ + y₁⁴.x₂.x₃²
• u₂² = y₂².x₃².x₄² + y₁.x₃².u₂ + y₁³.x₃.u₂ + x₂.x₃³.x₄ + x₂.x₃⁴ + y₁².x₂.x₃³ + y₁⁴.t₂ + y₁⁴.x₂.x₃² + y₁².r
• u₁.u₃ = y₃.x₄².u₁ + y₂.x₃.x₄.u₁ + x₄².t₂ + x₄².t₁ + x₃.x₄.t₁ + x₂.x₄⁴ + x₁.x₄⁴ + x₁.x₃².x₄² + x₁.x₃³.x₄ + y₃².x₄.t₁ + y₃².x₁.x₄³ + y₃⁴.t₁ + y₃⁶.x₁.x₄ + y₃⁸.x₁ + y₂².x₄.t₂ + y₂².x₄.t₁ + y₂³.x₁.x₃.w + y₂⁴.t₂ + y₂⁴.t₁ + y₂⁴.x₁.x₄² + y₂⁴.x₁.x₃² + y₂⁸.x₁ + y₃².r
• u₁.u₂ = y₂.x₃.x₄.u₁ + x₃.x₄.t₂ + x₃.x₄.t₁ + x₃².t₁ + x₂.x₃³.x₄ + x₁.x₃⁴ + y₃².x₄.t₁ + y₃⁴.t₁ + y₃⁴.x₁.x₄² + y₃⁸.x₁ + y₂.w.t₂ + y₂².x₄.t₂ + y₂².x₁.x₃.x₄² + y₂².x₁.x₃³ + y₂³.x₁.x₃.w + y₂⁴.t₂ + y₂⁴.t₁ + y₂⁴.x₁.x₄² + y₂⁴.x₁.x₃.x₄ + y₂⁶.x₁.x₄ + y₂⁸.x₁
• u₁² = x₃².x₄³ + x₃³.x₄² + y₃.x₄².u₁ + y₂.x₃.x₄.u₁ + y₂².w.u₁ + y₂².x₃.x₄³ + y₂².x₃².x₄² + y₂².x₃³.x₄ + y₂³.x₄².w + y₂³.x₃.u₁ + y₂³.x₃².w + y₂⁴.x₃.x₄² + y₂⁴.x₃².x₄ + y₂⁵.u₁ + y₂⁵.x₄.w + y₂⁷.w + x₂.x₄⁴ + x₂.x₃³.x₄ + x₁.x₃².x₄² + x₁.x₃³.x₄ + y₃².x₄.t₁ + y₃².x₁.x₄³ + y₂.w.t₂ + y₂².x₄.t₂ + y₂².x₃.t₂ + y₂².x₃.t₁ + y₂².x₁.x₄³ + y₂².x₁.x₃².x₄ + y₂⁴.t₂ + y₂⁴.x₁.x₄² + y₂⁵.x₁.w + y₂⁶.x₁.x₃ + y₃².r + y₂².r
• u₃.t₂ = y₃³.x₄.t₁ + y₃⁵.t₁ + y₃⁵.x₁.x₄² + y₃⁹.x₁ + y₂.x₃.x₄.t₂ + y₃.x₁.r
• u₃.t₁ = y₃.x₄².t₁ + y₃³.x₄.t₁ + y₃³.x₁.x₄³ + y₃⁵.t₁ + y₃⁹.x₁ + y₂.x₃.x₄.t₁ + y₃.x₁.r
• u₂.t₂ = y₂.x₃.x₄.t₂ + y₁.x₃².t₂ + y₁³.x₂.x₃³ + y₁.x₂.r
• u₂.t₁ = y₂.x₃.x₄.t₁
• u₁.t₂ = x₄.w.t₂ + x₄.w.t₁ + x₃.w.t₁ + y₃³.x₄.t₁ + y₃⁵.t₁ + y₃⁵.x₁.x₄² + y₃⁹.x₁ + y₂.x₄².t₂ + y₂.x₃.x₄.t₁ + y₂.x₃².t₂ + y₂².w.t₂ + y₂².w.t₁ + y₂³.x₄.t₂ + y₂³.x₃.t₂ + y₂³.x₃.t₁ + y₂⁵.t₂ + y₃.x₁.r
• u₁.t₁ = x₄.w.t₂ + x₄.w.t₁ + x₁.x₃³.w + y₃.x₄².t₁ + y₃³.x₄.t₁ + y₃³.x₁.x₄³ + y₃⁵.t₁ + y₃⁹.x₁ + y₂.x₄².t₁ + y₂.x₃².t₂ + y₂.x₃².t₁ + y₂.x₁.x₄⁴ + y₂.x₁.x₃².x₄² + y₂.x₁.x₃³.x₄ + y₂.x₁.x₃⁴ + y₂².w.t₂ + y₂³.x₃.t₁ + y₂³.x₁.x₄³ + y₂³.x₁.x₃².x₄ + y₂³.x₁.x₃³ + y₂⁴.x₁.x₃.w + y₂⁵.t₁ + y₂⁵.x₁.x₃.x₄ + y₂⁵.x₁.x₃² + y₂⁷.x₁.x₄ + y₂⁹.x₁ + y₃.x₁.r + y₂.x₁.r
• t₂² = 0
• t₁.t₂ = 0
• t₁² = 0

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

• y₁².x₄ = 0
• y₁.x₂.x₄ = 0
• x₂.x₃.x₄² = x₂.x₃².x₄
• y₁.x₄.t₂ = 0
• x₁.x₃.x₄³ = x₁.x₃³.x₄ + y₂.w.t₂ + y₂.x₁.x₃².w + y₂².x₄.t₁ + y₂².x₃.t₁ + y₂².x₁.x₄³ + y₂².x₁.x₃³ + y₂⁴.t₂ + y₂⁴.t₁ + y₂⁴.x₁.x₃.x₄ + y₂⁶.x₁.x₃ + y₂⁸.x₁

Completion information

This cohomology ring was obtained from a calculation out to degree 18. The cohomology ring approximation is stable from degree 12 onwards, and Benson's tests detect stability from degree 17 onwards.

This cohomology ring has dimension 4 and depth 2. Here is a homogeneous system of parameters:

• h₁ = r in degree 8
• h₂ = x₄² + x₃.x₄ + x₃² + y₃⁴ + y₂⁴ + y₁⁴ in degree 4
• h₃ = x₃.x₄² + x₃².x₄ + y₃².x₄² + y₂².x₄² + y₂².x₃.x₄ + y₂².x₃² + y₁².x₃² in degree 6
• h₄ = y₂ 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, 8, 14, 15.
• Filter degree type: -1, -2, -3, -4, -4.
• 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, h₄) is as follows.

• 1 in degree 0
• y₃ in degree 1
• y₁ in degree 1
• x₄ in degree 2
• x₃ in degree 2
• y₃² in degree 2
• y₁² in degree 2
• x₂ in degree 2
• x₁ in degree 2
• w in degree 3
• y₃.x₄ in degree 3
• y₃³ in degree 3
• y₁.x₄ in degree 3
• y₁.x₃ in degree 3
• y₁³ in degree 3
• y₃.x₁ in degree 3
• y₁.x₂ in degree 3
• x₃.x₄ in degree 4
• x₃² in degree 4
• y₃².x₄ in degree 4
• y₃⁴ in degree 4
• y₁².x₃ in degree 4
• y₁⁴ in degree 4
• x₂.x₄ in degree 4
• x₂.x₃ in degree 4
• x₁.x₄ in degree 4
• x₁.x₃ in degree 4
• y₃².x₁ in degree 4
• y₁².x₂ in degree 4
• u₃ in degree 5
• u₂ in degree 5
• u₁ in degree 5
• x₄.w in degree 5
• x₃.w in degree 5
• y₃³.x₄ in degree 5
• y₃⁵ in degree 5
• y₁.x₃.x₄ in degree 5
• y₁³.x₃ in degree 5
• y₁⁵ in degree 5
• x₁.w in degree 5
• y₃.x₁.x₄ in degree 5
• y₃³.x₁ in degree 5
• y₁.x₂.x₃ in degree 5
• y₁³.x₂ in degree 5
• x₃².x₄ in degree 6
• y₃.u₁ in degree 6
• y₃⁴.x₄ in degree 6
• y₃⁶ in degree 6
• y₁.u₂ in degree 6
• y₁⁴.x₃ in degree 6
• y₁⁶ in degree 6
• t₂ in degree 6
• t₁ in degree 6
• x₂.x₃.x₄ in degree 6
• x₁.x₃² in degree 6
• y₃².x₁.x₄ in degree 6
• y₃⁴.x₁ in degree 6
• y₁².x₂.x₃ in degree 6
• y₁⁴.x₂ in degree 6
• x₄.u₃ in degree 7
• x₄.u₁ in degree 7
• x₃.u₃ in degree 7
• x₃.u₂ in degree 7
• x₃.u₁ in degree 7
• x₃.x₄.w in degree 7
• x₃².w in degree 7
• y₃².u₁ in degree 7
• y₃⁵.x₄ in degree 7
• y₁².u₂ in degree 7
• y₁⁵.x₃ in degree 7
• x₁.x₃.w in degree 7
• y₃.t₁ in degree 7
• y₃³.x₁.x₄ in degree 7
• y₃⁵.x₁ in degree 7
• y₁.t₂ in degree 7
• y₁³.x₂.x₃ in degree 7
• y₁⁵.x₂ in degree 7
• w.u₁ in degree 8
• y₃.x₄.u₁ in degree 8
• y₃³.u₁ in degree 8
• y₃⁶.x₄ in degree 8
• y₁.x₃.u₂ in degree 8
• y₁³.u₂ in degree 8
• y₁⁶.x₃ in degree 8
• x₄.t₂ in degree 8
• x₄.t₁ in degree 8
• x₃.t₂ in degree 8
• x₃.t₁ in degree 8
• y₃².t₁ in degree 8
• y₃⁴.x₁.x₄ in degree 8
• y₁².t₂ in degree 8
• y₁⁴.x₂.x₃ in degree 8
• x₃.x₄.u₁ in degree 9
• x₃².u₃ in degree 9
• x₃².u₁ in degree 9
• x₃².x₄.w in degree 9
• y₃².x₄.u₁ in degree 9
• y₃⁴.u₁ in degree 9
• y₁².x₃.u₂ in degree 9
• y₁⁴.u₂ in degree 9
• w.t₂ in degree 9
• w.t₁ in degree 9
• y₃.x₄.t₁ in degree 9
• y₃³.t₁ in degree 9
• y₃⁵.x₁.x₄ in degree 9
• y₁.x₃.t₂ in degree 9
• y₁³.t₂ in degree 9
• y₁⁵.x₂.x₃ in degree 9
• x₄.w.u₁ in degree 10
• x₃.w.u₁ in degree 10
• y₃³.x₄.u₁ in degree 10
• y₃⁵.u₁ in degree 10
• y₁³.x₃.u₂ in degree 10
• y₁⁵.u₂ in degree 10
• x₃.x₄.t₂ in degree 10
• x₃.x₄.t₁ in degree 10
• x₃².t₂ in degree 10
• x₃².t₁ in degree 10
• y₃².x₄.t₁ in degree 10
• y₃⁴.t₁ in degree 10
• y₁².x₃.t₂ in degree 10
• y₁⁴.t₂ in degree 10
• x₃².x₄.u₁ in degree 11
• y₃⁴.x₄.u₁ in degree 11
• y₁⁴.x₃.u₂ in degree 11
• x₄.w.t₂ in degree 11
• x₄.w.t₁ in degree 11
• x₃.w.t₂ in degree 11
• x₃.w.t₁ in degree 11
• y₃³.x₄.t₁ in degree 11
• y₃⁵.t₁ in degree 11
• y₁³.x₃.t₂ in degree 11
• y₁⁵.t₂ in degree 11
• x₃.x₄.w.u₁ in degree 12
• x₃².w.u₁ in degree 12
• y₃⁵.x₄.u₁ in degree 12
• y₁⁵.x₃.u₂ in degree 12
• x₃².x₄.t₂ in degree 12
• x₃².x₄.t₁ in degree 12
• y₃⁴.x₄.t₁ in degree 12
• y₃⁶.t₁ in degree 12
• y₁⁴.x₃.t₂ in degree 12
• y₁⁶.t₂ in degree 12
• x₃.x₄.w.t₁ in degree 13
• x₃².w.t₂ in degree 13
• x₃².w.t₁ in degree 13
• y₃⁵.x₄.t₁ in degree 13
• y₁⁵.x₃.t₂ in degree 13
• x₃².x₄.w.u₁ in degree 14
• y₃⁶.x₄.t₁ in degree 14
• y₁⁶.x₃.t₂ in degree 14
• x₃².x₄.w.t₁ in degree 15

A basis for Ann_{R/(h1, h2, h3)}(h₄) is as follows.

• y₃ in degree 1
• y₁ in degree 1
• y₃² in degree 2
• y₁² in degree 2
• x₂ in degree 2
• y₃.x₄ in degree 3
• y₃³ in degree 3
• y₁.x₄ in degree 3
• y₁.x₃ in degree 3
• y₁³ in degree 3
• y₃.x₁ in degree 3
• y₁.x₂ in degree 3
• y₃².x₄ in degree 4
• y₃⁴ in degree 4
• y₁².x₃ in degree 4
• y₁⁴ in degree 4
• x₂.x₄ in degree 4
• x₂.x₃ in degree 4
• y₃².x₁ in degree 4
• y₁².x₂ in degree 4
• y₃³.x₄ in degree 5
• y₃⁵ in degree 5
• y₁.x₃.x₄ in degree 5
• y₁³.x₃ in degree 5
• y₁⁵ in degree 5
• y₃.x₁.x₄ in degree 5
• y₃³.x₁ in degree 5
• y₁.x₂.x₃ in degree 5
• y₁³.x₂ in degree 5
• y₃.u₁ in degree 6
• y₃⁴.x₄ in degree 6
• y₃⁶ in degree 6
• y₁.u₂ in degree 6
• y₁⁴.x₃ in degree 6
• y₁⁶ in degree 6
• x₂.x₃.x₄ in degree 6
• x₁.x₃² + u₃.h + x₃.x₄.h² + x₁.x₄.h² in degree 6
• y₃².x₁.x₄ in degree 6
• y₃⁴.x₁ in degree 6
• y₁².x₂.x₃ in degree 6
• y₁⁴.x₂ in degree 6
• y₃².u₁ in degree 7
• y₃⁵.x₄ in degree 7
• y₁².u₂ in degree 7
• y₁⁵.x₃ in degree 7
• y₃.t₁ in degree 7
• y₃³.x₁.x₄ in degree 7
• y₃⁵.x₁ in degree 7
• y₁.t₂ in degree 7
• y₁³.x₂.x₃ in degree 7
• y₁⁵.x₂ in degree 7
• y₃.x₄.u₁ in degree 8
• y₃³.u₁ in degree 8
• y₃⁶.x₄ in degree 8
• y₁.x₃.u₂ in degree 8
• y₁³.u₂ in degree 8
• y₁⁶.x₃ in degree 8
• y₃².t₁ in degree 8
• y₃⁴.x₁.x₄ in degree 8
• y₁².t₂ in degree 8
• y₁⁴.x₂.x₃ in degree 8
• x₄.u₃.h + x₃.u₂.h + x₁.x₃.h⁴ + h⁸ in degree 8
• x₃.u₃.h + x₃².x₄.h² + u₃.h³ + u₂.h³ + x₁.h⁶ in degree 8
• x₃².u₃ + x₃.u₂.h² + x₃².x₄.h³ + u₃.h⁴ + u₂.h⁴ + x₃.x₄.h⁵ + x₁.x₃.h⁵ + x₄.h⁷ + x₁.h⁷ in degree 9
• y₃².x₄.u₁ in degree 9
• y₃⁴.u₁ in degree 9
• y₁².x₃.u₂ in degree 9
• y₁⁴.u₂ in degree 9
• w.t₂ + x₄.t₂.h + x₄.t₁.h + x₃.t₁.h + x₃.u₂.h² + x₁.x₃.w.h² + x₃².x₄.h³ + t₁.h³ + u₃.h⁴ + x₃.x₄.h⁵ + x₁.x₄.h⁵ + x₁.x₃.h⁵ + x₁.h⁷ in degree 9
• y₃.x₄.t₁ in degree 9
• y₃³.t₁ in degree 9
• y₃⁵.x₁.x₄ in degree 9
• y₁.x₃.t₂ in degree 9
• y₁³.t₂ in degree 9
• y₁⁵.x₂.x₃ in degree 9
• y₃³.x₄.u₁ in degree 10
• y₃⁵.u₁ in degree 10
• y₁³.x₃.u₂ in degree 10
• y₁⁵.u₂ in degree 10
• x₃.x₄.t₂ + x₄.t₂.h² + x₃.t₂.h² + x₃.u₂.h³ + x₃².x₄.h⁴ + t₂.h⁴ + x₁.w.h⁵ + x₁.x₄.h⁶ + x₁.x₃.h⁶ in degree 10
• y₃².x₄.t₁ in degree 10
• y₃⁴.t₁ in degree 10
• y₁².x₃.t₂ in degree 10
• y₁⁴.t₂ in degree 10
• y₃⁴.x₄.u₁ in degree 11
• y₁⁴.x₃.u₂ in degree 11
• x₄.w.t₂ + x₄².t₂.h + x₄².t₁.h + x₃.x₄.t₁.h + x₃.x₄.u₂.h² + x₁.x₃.x₄.w.h² + x₃².x₄².h³ + x₄.t₁.h³ + x₄.u₃.h⁴ + x₃.x₄².h⁵ + x₁.x₄².h⁵ + x₁.x₃.x₄.h⁵ + x₁.x₄.h⁷ in degree 11
• x₃.w.t₂ + x₃.x₄.t₂.h + x₃.x₄.t₁.h + x₃².t₁.h + x₃².u₂.h² + x₁.x₃².w.h² + x₃³.x₄.h³ + x₃.t₁.h³ + x₃.u₃.h⁴ + x₃².x₄.h⁵ + x₁.x₃.x₄.h⁵ + x₁.x₃².h⁵ + x₁.x₃.h⁷ in degree 11
• y₃³.x₄.t₁ in degree 11
• y₃⁵.t₁ in degree 11
• y₁³.x₃.t₂ in degree 11
• y₁⁵.t₂ in degree 11
• y₃⁵.x₄.u₁ in degree 12
• y₁⁵.x₃.u₂ in degree 12
• x₃².x₄.t₂ + x₃.x₄.t₂.h² + x₃².t₂.h² + x₃².u₂.h³ + x₃³.x₄.h⁴ + x₃.t₂.h⁴ + x₁.x₃.w.h⁵ + x₁.x₃.x₄.h⁶ + x₁.x₃².h⁶ in degree 12
• y₃⁴.x₄.t₁ in degree 12
• y₃⁶.t₁ in degree 12
• y₁⁴.x₃.t₂ in degree 12
• y₁⁶.t₂ in degree 12
• x₃².w.t₂ + x₃².x₄.t₂.h + x₃².x₄.t₁.h + x₃³.t₁.h + x₃³.u₂.h² + x₁.x₃³.w.h² + x₃⁴.x₄.h³ + x₃².t₁.h³ + x₃².u₃.h⁴ + x₃³.x₄.h⁵ + x₁.x₃².x₄.h⁵ + x₁.x₃³.h⁵ + x₁.x₃².h⁷ in degree 13
• y₃⁵.x₄.t₁ in degree 13
• y₁⁵.x₃.t₂ in degree 13
• y₃⁶.x₄.t₁ in degree 14
• y₁⁶.x₃.t₂ in degree 14

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

• y₁.x₄ in degree 3
• y₁.x₃.x₄ in degree 5
• x₂.x₃.x₄ in degree 6
• x₂.x₃² + y₁⁴.x₂ in degree 6
• x₂.x₃².x₄ in degree 8

Restriction information

Restriction to special subgroup number 1, which is 2gp1

• y₁ restricts to 0
• y₂ restricts to 0
• y₃ restricts to 0
• x₁ restricts to 0
• x₂ restricts to 0
• x₃ restricts to 0
• x₄ restricts to 0
• w restricts to 0
• u₁ restricts to 0
• u₂ restricts to 0
• u₃ restricts to 0
• t₁ restricts to 0
• t₂ 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 y₂
• x₁ restricts to 0
• x₂ restricts to 0
• x₃ restricts to 0
• x₄ restricts to y₃² + y₂.y₃
• w restricts to 0
• u₁ restricts to y₁².y₂³ + y₁⁴.y₂
• u₂ restricts to 0
• u₃ restricts to y₁².y₂³ + y₁⁴.y₂
• t₁ restricts to 0
• t₂ 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 y₂
• y₂ restricts to 0
• y₃ restricts to 0
• x₁ restricts to 0
• x₂ restricts to 0
• x₃ restricts to y₃² + y₂.y₃
• x₄ restricts to 0
• w restricts to 0
• u₁ restricts to 0
• u₂ restricts to y₁².y₂³ + y₁⁴.y₂
• u₃ restricts to 0
• t₁ restricts to 0
• t₂ restricts to 0
• r restricts to y₁².y₂².y₃⁴ + y₁².y₂⁵.y₃ + y₁⁴.y₃⁴ + y₁⁴.y₂³.y₃ + y₁⁴.y₂⁴ + y₁⁸

Restriction to special subgroup number 4, which is 16gp14

• y₁ restricts to 0
• y₂ restricts to y₂
• y₃ restricts to 0
• x₁ restricts to 0
• x₂ restricts to 0
• x₃ restricts to y₄² + y₂.y₄
• x₄ restricts to y₃² + y₂.y₃
• w restricts to y₃.y₄² + y₃².y₄ + y₂.y₃.y₄ + y₁².y₂
• u₁ restricts to y₃².y₄³ + y₃³.y₄² + y₂.y₃².y₄² + y₁².y₂.y₄² + y₁².y₂.y₃² + y₁².y₂².y₄ + y₁².y₂².y₃ + y₁⁴.y₂
• u₂ restricts to y₂.y₃².y₄² + y₂².y₃.y₄² + y₂².y₃².y₄ + y₂³.y₃.y₄
• u₃ restricts to y₂.y₃².y₄² + y₂².y₃.y₄² + y₂².y₃².y₄ + y₂³.y₃.y₄
• t₁ restricts to 0
• t₂ restricts to 0
• r restricts to y₃⁴.y₄⁴ + y₂.y₃⁴.y₄³ + y₂.y₃⁵.y₄² + y₂².y₃³.y₄³ + y₂³.y₃.y₄⁴ + y₂³.y₃².y₄³ + y₂³.y₃³.y₄² + y₂⁴.y₃².y₄² + y₂⁵.y₃².y₄ + y₂⁶.y₃.y₄ + y₁².y₃².y₄⁴ + y₁².y₃⁴.y₄² + y₁².y₂².y₃⁴ + y₁².y₂³.y₃.y₄² + y₁².y₂³.y₃².y₄ + y₁².y₂⁴.y₄² + y₁².y₂⁴.y₃.y₄ + y₁².y₂⁴.y₃² + y₁².y₂⁵.y₄ + y₁².y₂⁶ + y₁⁴.y₄⁴ + y₁⁴.y₃².y₄² + y₁⁴.y₃⁴ + y₁⁴.y₂².y₄² + y₁⁴.y₂³.y₃ + y₁⁴.y₂⁴ + y₁⁶.y₂² + y₁⁸

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Poincaré series

(1 + 2t + 4t² + 5t³ + 5t⁴ + 7t⁵ + 6t⁶ + 6t⁷ + 5t⁸ + 3t⁹ + 3t¹⁰ + t¹¹ + t¹² - t¹⁴) / (1 - t) (1 - t⁴) (1 - t⁶) (1 - t⁸)

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Back to the groups of order 128