Weight reduction for cohomological mod p modular forms over imaginary quadratic fields
Abstract
Let F be an imaginary quadratic field and O its ring of integers. Let n ⊂ O be a non-zero ideal and let p> 5 be a rational inert prime in F and coprime with n. Let V be an irreducible finite dimensional representation of Fp[ GL2(Fp2)]. We establish that a system of Hecke eigenvalues appearing in the cohomology with coefficients in V already lives in the cohomology with coefficients in Fp dete for some e ≥ 0; except possibly in some few cases.
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