Top-dimensional rational cohomology of the congruence subgroup Γ0,n+(p)
Abstract
Let Γ0,n+(p)⊂ SLn(Z) be the congruence subgroup of level-p whose first column is of the form (*,0,…,0)t p. We prove that the top-dimensional cohomology group Hn2(Γ0,n+(p);Q) vanishes for p∈\2,3,5,7,13\ if n ≥ 3, as well as for p ≤ 6n-14. Additionally, we prove a non-vanishing result, showing that this cohomology group is nonzero for n = 2 for every prime p, and for n=3 for all primes p \2,3,5,7,13\.
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