Codimensions one and two cohomology of Hecke congruence subgroups
Abstract
For n≥ 1 and p a prime, the Hecke congruence subgroup Γ0,n(p)≤ SLn(Z) is the subgroup of matrices whose first column is of the form (*,0,…,0)t p. Borel--Serre showed that Γ0,n(p) has virtual cohomological dimension n2. The first author proved that the rational cohomology in this top degree n2 vanishes for n sufficiently large compared to p. We prove analogous results in codimension 1 and 2.
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