19/03/01 20:47:24.27 lY5li5u4.net
>>690
Riemann hypothesisで、Riemann自身はゼロ点を3つ計算したらしいね
これ数学じゃないと(^^;
関係ないけど、Ivan Fesenko 先生の名前があったので貼る(^^
URLリンク(en.wikipedia.org)
Riemann hypothesis
Numerical calculations
1859? 3 B. Riemann used the Riemann?Siegel formula (unpublished, but reported in Siegel 1932).
Attempted proofs
Arithmetic zeta functions of models of elliptic curves over number fields
When one goes from geometric dimension one, e.g. an algebraic number field, to geometric dimension two, e.g. a regular model of an elliptic curve over a number field, the two-dimensional part of the generalized Riemann hypothesis for the arithmetic zeta function of the model deals with the poles of the zeta function.
In dimension one the study of the zeta integral in Tate's thesis does not lead to new important information on the Riemann hypothesis.
Contrary to this, in dimension two work of Ivan Fesenko on two-dimensional generalisation of Tate's thesis includes an integral representation of a zeta integral closely related to the zeta function. In this new situation, not possible in dimension one, the poles of the zeta function can be studied via the zeta integral and associated adele groups.
Related conjecture of Fesenko (2010) on the positivity of the fourth derivative of a boundary function associated to the zeta integral essentially implies the pole part of the generalized Riemann hypothesis.
Suzuki (2011) proved that the latter, together with some technical assumptions, implies Fesenko's conjecture.