Free actions on products of real projective spaces
Abstract
We prove that if G=(Z/2)r acts freely and cellularly on a finite-dimensional CW-complex X homotopy equivalent to RP n1 × ·s × R P nk with trivial action on the mod-2 cohomology, then r ≤ μ (n1)+ ·s + μ(nk ) where for each integer n≥ 0, μ (n)=0 if n is even, μ(n)=1 if n 1 mod 4, and μ(n)=2 if n 3 mod 4. This proves a homotopy-theoretic version of a conjecture of Cusick.
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