Problem 90
If $f$ is Anosov on $M$ and $\tilde M$ contractible, what does $H^k(M)(\sim H^k (\pi _1(M)) )$ tell you via $f_\ast$ eigenvalue information? (See [hu1968introduction] , pp. 200-202)
If $f$ is Anosov on $M$ and $\tilde M$ contractible, what does $H^k(M)(\sim H^k (\pi _1(M)) )$ tell you via $f_\ast$ eigenvalue information? (See [hu1968introduction] , pp. 200-202)
Comments
$\tilde{M}$ is the universal cover of $M$; the book reference to Hu is our best guess.