Restriction to the Maximal Elementary Abelian Subgroup

The images of the generators of the cohomology of G restricted to E are

0 ,

0 ,

0 ,

z² ,

y⁴
in the cohomology of E.

The kernel of the restriction to E (Minimal Prime) of the cohomology of G is generated by

z ,

y ,

x .

This ideal is also the nilradical of the cohomology of G.

It is nilpotent of degree 5.

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Restrictions to Maximal Subgroups

Maximal Subgroup H #1 Generated by [ G.4, G.2, G.1, G.5 ] .

The Group H is Isomorphic to the Group of Order 16 Number10 GrpPC of order 16 = 2^4 PC-Relations: $.1^2 = $.3, $.2^2 = $.3, $.2^$.1 = $.2 * $.4 Generated by [ G.1 * G.2, G.2 ] .

The images of the generators of the cohomology of G restricted to H are

z ,

z + y ,

0 ,

x ,

w²
in the cohomology of H.

The kernel of the restriction to H of the cohomology of G is generated by

x .

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Maximal Subgroup H #2 Generated by [ G.1 * G.3 * G.4, G.4, G.1 * G.2 * G.4, G.5 ] .

The Group H is Isomorphic to the Group of Order 16 Number10 GrpPC of order 16 = 2^4 PC-Relations: $.1^2 = $.3, $.2^2 = $.3, $.2^$.1 = $.2 * $.4 Generated by [ G.1 * G.3 * G.4, G.1 * G.2 * G.4 ] .

The images of the generators of the cohomology of G restricted to H are

z + y ,

y ,

z ,

x ,

z²x + x² + w²
in the cohomology of H.

The kernel of the restriction to H of the cohomology of G is generated by

z + y + x .

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Maximal Subgroup H #3 Generated by [ G.4, G.2 * G.3, G.1, G.5 ] .

The group H is abelian of type [ 4, 4 ]

The cohomology ring of H is a the quotient of a polynomial ring in the variables
[ z, y, x, w ] , in degrees [ 1, 1, 2, 2 ] , by the ideal of relations

z² , y² .

The images of the generators of the cohomology of G restricted to H are

y ,

z ,

z ,

x + w ,

zyx + zyw + x²
in the cohomology of H.

The kernel of the restriction to H of the cohomology of G is generated by

y + x .

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Maximal Subgroup H #4 Generated by [ G.3, G.4, G.1, G.5 ] .

The Group H is Isomorphic to the Group of Order 16 Number10 GrpPC of order 16 = 2^4 PC-Relations: $.1^2 = $.3, $.2^2 = $.3, $.2^$.1 = $.2 * $.4 Generated by [ G.1 * G.3, G.3 ] .

The images of the generators of the cohomology of G restricted to H are

z ,

0 ,

z + y ,

x ,

z²x + w²
in the cohomology of H.

The kernel of the restriction to H of the cohomology of G is generated by

y .

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Maximal Subgroup H #5 Generated by [ G.3, G.4, G.2, G.5 ] .

The Group H is Isomorphic to the Group of Order 16 Number10 GrpPC of order 16 = 2^4 PC-Relations: $.1^2 = $.3, $.2^2 = $.3, $.2^$.1 = $.2 * $.4 Generated by [ G.3, G.2 ] .

The images of the generators of the cohomology of G restricted to H are

0 ,

y ,

z ,

x ,

x² + w²
in the cohomology of H.

The kernel of the restriction to H of the cohomology of G is generated by

z .

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Maximal Subgroup H #6 Generated by [ G.3, G.4, G.1 * G.2 * G.4, G.5 ] .

The Group H is Isomorphic to the Group of Order 16 Number7 GrpPC of order 16 = 2^4 PC-Relations: $.1^2 = $.4, $.2^2 = $.4, $.2^$.1 = $.2 * $.4 Generated by [ G.3, G.1 * G.2 * G.4, G.5 ]

of type Cyclic(2) x Quaternion(8) .

The images of the generators of the cohomology of G restricted to H are

y ,

y ,

z ,

zx + yx + x² ,

zyx² + x⁴ + w
in the cohomology of H.

The kernel of the restriction to H of the cohomology of G is generated by

z + y .

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Maximal Subgroup H #7 Generated by [ G.1 * G.3 * G.4, G.4, G.2, G.5 ] .

The Group H is Isomorphic to the Group of Order 16 Number7 GrpPC of order 16 = 2^4 PC-Relations: $.1^2 = $.4, $.2^2 = $.4, $.2^$.1 = $.2 * $.4 Generated by [ G.1 * G.3 * G.4, G.2, G.5 ]

of type Cyclic(2) x Quaternion(8) .

The images of the generators of the cohomology of G restricted to H are

z ,

y ,

z ,

z² + y² + zx + yx + x² ,

zy²x + zyx² + y²x² + x⁴ + w
in the cohomology of H.

The kernel of the restriction to H of the cohomology of G is generated by

z + x .

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The essential cohomology of G is generated as an ideal by

zyx + yx² .

It is nilpotent of degree 2.

The annihilator of the Essential Cohomology has dimension 2 .
The essential cohomology is a free module over the polynomial subring Q of the cohomology ring of G generated by w , v .
The essential cohomology is generated as a module over Q by the elements

[] [] [ zyx+ yx² ] [ zyx² ]

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Inflations from Maximal Quotient Groups

Maximal Quotient Group Q #1

The kernel of the quotient is generated by G.5 .

The Group Q is Isomorphic to the Group of Order 16 Number7 GrpPC of order 16 = 2^4 PC-Relations: $.1^2 = $.4, $.2^2 = $.4, $.2^$.1 = $.2 * $.4

of type Cyclic(2) x Quaternion(8) .

The generators of G have images [ pcy.1, pcy.1 * pcy.3, pcy.2 ] in the quotient group.

The images of the generators of the cohomology of Q inflated to G are

y + x ,

z ,

y ,

zyx² + y²w + zxw + x²w + w² + v
in the cohomology of G.

The kernel of the inflation to G of the cohomology of Q is generated by

zy + y² + zx + x² .

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Maximal Quotient Group Q #2

The kernel of the quotient is generated by G.4 * G.5 .

The Group Q is Isomorphic to the Group of Order 16 Number6 GrpPC of order 16 = 2^4 PC-Relations: $.3^2 = $.4, $.3^$.1 = $.3 * $.4, $.3^$.2 = $.3 * $.4

of type Cyclic(2) x Dihedral(8) .

The generators of G have images [ pcy.1 * pcy.3, pcy.1 * pcy.4, pcy.1 * pcy.2 * pcy.3 ] in the quotient group.

The images of the generators of the cohomology of Q inflated to G are

z + y + x ,

z ,

z + x ,

y² + x² + w
in the cohomology of G.

The kernel of the inflation to G of the cohomology of Q is generated by

z² + zy + y² ,

y³ .

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Maximal Quotient Group Q #3

The kernel of the quotient is generated by G.4 .

The Group Q is Isomorphic to the Group of Order 16 Number7 GrpPC of order 16 = 2^4 PC-Relations: $.1^2 = $.4, $.2^2 = $.4, $.2^$.1 = $.2 * $.4

of type Cyclic(2) x Quaternion(8) .

The generators of G have images [ pcy.2, pcy.1, pcy.3 ] in the quotient group.

The images of the generators of the cohomology of Q inflated to G are

y ,

x ,

z ,

zyx² + zxw + v
in the cohomology of G.

The kernel of the inflation to G of the cohomology of Q is generated by

zy + zx + yx + x² .

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Action of Automorphisms

The groups of outer automorphisms of G has order 64, and is generated by 6 elements.

Automorphism #1

The order of the class of the automorphism in the outer automorphism group is 2. The images of the generators of G are

G.1
G.2 * G.4
G.3
G.4
G.5 .

The images of the generators of the cohomology of G under the map induced by the automorphism are

z ,

y ,

x ,

y² + x² + w ,

zyx² + v .

Automorphism #2

The order of the class of the automorphism in the outer automorphism group is 2. The images of the generators of G are

G.1 * G.4 * G.5
G.2 * G.4 * G.5
G.3
G.4
G.5 .

The images of the generators of the cohomology of G under the map induced by the automorphism are

z ,

y ,

x ,

w ,

v .

Automorphism #3

The order of the class of the automorphism in the outer automorphism group is 2. The images of the generators of G are

G.1 * G.4
G.2 * G.4
G.3
G.4
G.5 .

The images of the generators of the cohomology of G under the map induced by the automorphism are

z ,

y ,

x ,

w ,

v .

Automorphism #4

The order of the class of the automorphism in the outer automorphism group is 2. The images of the generators of G are

G.1
G.1 * G.2 * G.4
G.1 * G.3 * G.4
G.4
G.5 .

The images of the generators of the cohomology of G under the map induced by the automorphism are

z + y + x ,

y ,

x ,

w ,

y²w + v .

Automorphism #5

The order of the class of the automorphism in the outer automorphism group is 2. The images of the generators of G are

G.1
G.3 * G.5
G.2
G.4
G.5 .

The images of the generators of the cohomology of G under the map induced by the automorphism are

z ,

x ,

y ,

w ,

zyw + zxw + v .

Automorphism #6

The order of the class of the automorphism in the outer automorphism group is 4. The images of the generators of G are

G.2 * G.3 * G.4
G.1 * G.3 * G.5
G.3
G.5
G.4 .

The images of the generators of the cohomology of G under the map induced by the automorphism are

y ,

z ,

z + y + x ,

w ,

zyw + y²w + zxw + w² + v .

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CHECKS

paramflag = true
qregflagflag = true
cmflag = true
essflag = true
centflag = true

THE COMPUTATION IS COMPLETE