A minimal set of generators for the cohomology is:

w₁(r₇) of degree 1
w₁(r₁₆) of degree 1
w₂(r₁₀) of degree 2
w₂(r₁₇) of degree 2
w₁(r₅) of degree 1

The Steenrod operations are as follows:

Sq¹(w₂(r₁₀)) = 0
Sq¹(w₂(r₁₇)) = w₁(r₁₆)w₂(r₁₇)

Here is a minimal system of equations:

(1) w₁(r₁₆)² = 0
(2) w₁(r₇)² + w₁(r₇)w₁(r₁₆) + w₁(r₁₆)w₁(r₅) + w₁(r₅)² = 0

Stiefel-Whitney classes:

w₁(r₁) = w₁(r₁₆)
w₁(r₂) = w₁(r₇) + w₁(r₅)
w₁(r₃) = w₁(r₇) + w₁(r₁₆) + w₁(r₅)
w₁(r₄) = w₁(r₁₆) + w₁(r₅)
w₁(r₅) = w₁(r₅)
w₁(r₆) = w₁(r₇) + w₁(r₁₆)
w₁(r₇) = w₁(r₇)
w₂(r₈) = w₁(r₇)w₁(r₁₆) + w₂(r₁₀) + w₁(r₁₆)w₁(r₅)
w₂(r₁₀) = w₂(r₁₀)
w₂(r₁₂) = w₁(r₇)² + w₂(r₁₀)
w₂(r₁₄) = w₁(r₇)² + w₁(r₇)w₁(r₁₆) + w₂(r₁₀) + w₁(r₁₆)w₁(r₅)
w₁(r₁₆) = w₁(r₁₆)
w₂(r₁₆) = w₁(r₇)² + w₁(r₇)w₁(r₁₆) + w₂(r₁₇)
w₁(r₁₇) = w₁(r₁₆)
w₂(r₁₇) = w₂(r₁₇)
w₄(r₁₈) = w₁(r₇)⁴ + w₂(r₁₀)² + w₂(r₁₇)²
w₄(r₁₉) = w₂(r₁₀)² + w₂(r₁₇)²

Chern classes:

c₁(r₁) = 0
c₁(r₂) = w₁(r₇)w₁(r₁₆) + w₁(r₁₆)w₁(r₅)
c₁(r₃) = w₁(r₇)w₁(r₁₆) + w₁(r₁₆)w₁(r₅)
c₁(r₄) = w₁(r₇)² + w₁(r₇)w₁(r₁₆) + w₁(r₁₆)w₁(r₅)
c₁(r₅) = w₁(r₇)² + w₁(r₇)w₁(r₁₆) + w₁(r₁₆)w₁(r₅)
c₁(r₆) = w₁(r₇)²
c₁(r₇) = w₁(r₇)²
c₁(r₈) = w₁(r₇)w₁(r₁₆) + w₂(r₁₀) + w₁(r₁₆)w₁(r₅)
c₁(r₉) = w₁(r₇)w₁(r₁₆) + w₂(r₁₀) + w₁(r₁₆)w₁(r₅)
c₁(r₁₀) = w₂(r₁₀)
c₁(r₁₁) = w₂(r₁₀)
c₁(r₁₂) = w₁(r₇)² + w₂(r₁₀)
c₁(r₁₃) = w₁(r₇)² + w₂(r₁₀)
c₁(r₁₄) = w₁(r₇)² + w₁(r₇)w₁(r₁₆) + w₂(r₁₀) + w₁(r₁₆)w₁(r₅)
c₁(r₁₅) = w₁(r₇)² + w₁(r₇)w₁(r₁₆) + w₂(r₁₀) + w₁(r₁₆)w₁(r₅)
c₁(r₁₆) = 0
c₂(r₁₆) = w₁(r₇)⁴ + w₂(r₁₇)²
c₁(r₁₇) = 0
c₂(r₁₇) = w₂(r₁₇)²
c₂(r₁₈) = w₁(r₇)⁴ + w₂(r₁₀)² + w₂(r₁₇)²
c₂(r₁₉) = w₂(r₁₀)² + w₂(r₁₇)²

The algebra of Milnor constants is generated by:

c₁(r₂) + c₁(r₈)
c₁(r₂) + c₁(r₄)
c₁(r₄)² + c₂(r₁₆)
c₁(r₄)
w₁(r₇)w₁(r₁₆)w₂(r₁₇) + w₁(r₁₆)w₂(r₁₇)w₁(r₅) which is not a combination of Chern classes; it is nilpotent of order 2

The results above have been produced during the second run in April, 2008.