A minimal set of generators for the cohomology is:
w
1
(r
1
) of degree 1
w
2
(r
9
) of degree 2
The Steenrod operations are as follows:
Sq
1
(w
2
(r
9
)) = 0
Here is a minimal system of equations:
(1) w
1
(r
1
)
2
= 0
Stiefel-Whitney classes:
w
1
(r
1
) = w
1
(r
1
)
w
2
(r
2
) = 0
w
2
(r
4
) = 0
w
2
(r
5
) = 0
w
2
(r
8
) = w
2
(r
9
)
w
2
(r
9
) = w
2
(r
9
)
w
2
(r
10
) = w
2
(r
9
)
w
2
(r
11
) = w
2
(r
9
)
Chern classes:
c
1
(r
1
) = 0
c
1
(r
2
) = 0
c
1
(r
3
) = 0
c
1
(r
4
) = 0
c
1
(r
5
) = 0
c
1
(r
6
) = 0
c
1
(r
7
) = 0
c
1
(r
8
) = w
2
(r
9
)
c
1
(r
9
) = w
2
(r
9
)
c
1
(r
10
) = w
2
(r
9
)
c
1
(r
11
) = w
2
(r
9
)
c
1
(r
12
) = w
2
(r
9
)
c
1
(r
13
) = w
2
(r
9
)
c
1
(r
14
) = w
2
(r
9
)
c
1
(r
15
) = w
2
(r
9
)
The algebra of Milnor constants is generated by:
c
1
(r
8
)
Note: the only algebraic cycles in the cohomology are Chern classes.
The results above have been produced during the second run in April, 2008.