学位论文详细信息
Bloch-Kato Conjecture for the Adjoint of H1(Xo(N)) with Integral Hecke Algebra
adjoint motives;Bloch-Kato conjecture;Burns-Flach conjecture;Modular forms
Lin, Qiang ; Flach, Matthias
University:California Institute of Technology
Department:Physics, Mathematics and Astronomy
关键词: adjoint motives;    Bloch-Kato conjecture;    Burns-Flach conjecture;    Modular forms;   
Others  :  https://thesis.library.caltech.edu/4595/1/BurnsFlachConjectureForIntegralHeckeAlgebra.pdf
美国|英语
来源: Caltech THESIS
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【 摘 要 】

Let M be a motive that is defined over a number field and admits an action of a finite dimensional semisimple Q-algebra T. David Burns and Matthias Flach formulated a conjecture, which depends on a choice of Z-order T in T, for the leading coefficient of the Taylor expansion at 0 of the T-equivariant L-function of M. For primes l outside a finite set we prove the l-primary part of this conjecture for the specific case where M is the trace zero part of the adjoint of H^1(X_0(N)) for prime N and where T is the (commutative) integral Hecke algebra for cusp forms of weight 2 and the congruence group [Gamma_0](N), thus providing one of the first nontrivial supporting examples for the conjecture in a geometric situation where T is not the maximal order of T.

We also compare two Selmer groups, one of which appears in Bloch-Kato conjecture and the other a slight variant of what is defined by A. Wiles. A result on the Fontaine-Laffaille modules with coefficients in a local ring finite free over Z_l is obtained.

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