Adjoint motives of modular forms and the Tamagawa number conjecture

Abstract

Let f be a newform of weight k≥ 2, level N with coefficients in a number field K, and A the adjoint motive of the motive M associated to f. We carefully discuss the construction of the realisations of M and A, as well as natural integral structures in these realisations. We then use the method of Taylor and Wiles to verify the λ-part of the Tamagawa number conjecture of Bloch and Kato for L(A,0) and L(A,1). Here λ is any prime of K not dividing Nk!, and so that the mod λ representation associated to f is absolutely irreducible when restricted to the Galois group over Q((-1)(-1)/2) where λ . The method also establishes modularity of all lifts of the mod λ representation which are crystalline of Hodge-Tate type (0,k-1).

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