Krzysztof Klosin
Published 2007-08-22Version 1
An analogue over imaginary quadratic fields of a result in algebraic number theory known as Ihara's lemma is established. More precisely, we show that for a prime ideal P of the ring of integers of an imaginary quadratic field F, the kernel of the sum of the two standard P-degeneracy maps between the cuspidal sheaf cohomology H^1_!(X_0, M_0)^2 --> H^1_!(X_1, M_1) is Eisenstein. Here X_0 and X_1 are analogues over F of the modular curves X_0(N) and X_0(Np), respectively. To prove our theorem we use the method of modular symbols and the congruence subgroup property for the group SL(2) which is due to Serre.
On Ihara's lemma for degree one and two cohomology over imaginary quadratic fields
On the cohomology of linear groups over imaginary quadratic fields
An Eisenstein ideal for imaginary quadratic fields and the Bloch-Kato conjecture for Hecke characters
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