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comment How the equality in the first case is equivalent to the inequality in the last case?
@ Timo Keller: Thank you very much . I will read it now.
Oct
7
comment A generalisation of the Birch and Swinnerton-Dyer conjecture
@ Timo Keller: Received many thanks.
Oct
6
revised Some of the real zeros of those $k^{th}$ derivatives are also simple?
added 24 characters in body
Oct
6
asked Some of the real zeros of those $k^{th}$ derivatives are also simple?
Oct
2
comment How the equality in the first case is equivalent to the inequality in the last case?
@ Timo Keller: Can you please indicate to me the title of your PhD thesis or the possible form for a paper citation.
Jul
22
revised Is there is a known relation or expression containing the algebraic rank $r$?
deleted 126 characters in body
Jul
21
comment Solve this functional equation with respect to $f$
@Vladimir: Yes, Christian Remling is right. This is exactely my question.
Jul
21
asked Solve this functional equation with respect to $f$
Jul
20
revised How the equality in the first case is equivalent to the inequality in the last case?
added 40 characters in body
Jul
20
comment How the equality in the first case is equivalent to the inequality in the last case?
@ Timo Keller: But it is not true for curves over rationals.
Jul
20
accepted How the equality in the first case is equivalent to the inequality in the last case?
Jul
20
revised How the equality in the first case is equivalent to the inequality in the last case?
edited body
Jul
20
asked How the equality in the first case is equivalent to the inequality in the last case?
Jul
16
comment Riemann Siegel function and gamma function
@ Sangkyu Kim: It has no an explicit formula.
Jul
16
asked Can we deduce something about the nature of those solutions?
Jul
14
comment Riemann Siegel function and gamma function
@ Sangkyu Kim: But the gamma function has no closed form.
Jun
5
comment Can we use this formula to construct rational points on the curve $C$?
@ Joe Silverman: There is an error in the question: the constant is $v$ without known relation to rational numbers.
Jun
5
comment Can we use this formula to construct rational points on the curve $C$?
@ACL: There is an error in the question: the constant is $v$ without known relation to rational numbers.
Jun
5
revised Can we use this formula to construct rational points on the curve $C$?
added 17 characters in body
Jun
5
accepted Can we use this formula to construct rational points on the curve $C$?