Applications of the algebraic geometry of the Putman-Wieland conjecture
Abstract
We give two applications of our prior work toward the Putman-Wieland conjecture. First, we deduce a strengthening of a result of Markovi\'c-Tosi\'c on virtual mapping class group actions on the homology of covers. Second, let g≥ 2 and let g',n' g, n be a finite H-cover of topological surfaces. We show the virtual action of the mapping class group of g,n+1 on an H-isotypic component of H1(g') has non-unitary image.
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