1,020 reputation
1921
bio website ideasfornumbertheory.com
location France
age 33
visits member for 4 years, 3 months
seen 18 mins ago

I'm a former student in physics fond of number theory, especially Hilbert's 8th problem, further generalizations of the Riemann Hypothesis and almost everything related to prime numbers and L Functions. I'm also interested in Galois Theory even though I still don't know much about it.


2d
comment gamma-factor of a primitive element of the Selberg class
I sent you an e-mail with the considered article as an attached document.
2d
accepted gamma-factor of a primitive element of the Selberg class
2d
asked gamma-factor of a primitive element of the Selberg class
2d
comment Automorphism group of the gamma factor of a certain type of L-function
Let me clarify a little bit. As every factor of the gamma-factor is of the form $\Gamma(\lambda_{j}s+\mu_{j})$ for $j=1,...,r$, one can study the action of the subtitution $\sigma_{ij}$ that maps $\Gamma(\lambda_{i}s+\mu_{i})$ to $\Gamma(\lambda_{j}s+\mu_{j})$. Is the structure of the group of all such substitutions similar to the one of the group that permutes all the roots of an Euler factor viewed as a polynomial with indeterminate $x$ instead of $p^{-s}$ for a given $p$?
2d
comment Automorphism group of the gamma factor of a certain type of L-function
But they all share the same degree don't they?
2d
asked Automorphism group of the gamma factor of a certain type of L-function
Jun
28
comment Inverse Galois Problem…and parallelizable vector fields?
+1 cause I advocate originality and creative thinking.
Jun
27
accepted Does unique factorization for automorphic L-functions imply a weakened form of Ramanujan conjecture?
Jun
27
comment Does unique factorization for automorphic L-functions imply a weakened form of Ramanujan conjecture?
Here it is: homepage.math.uiowa.edu/~yey/papers/unique3.pdf
Jun
27
comment Does unique factorization for automorphic L-functions imply a weakened form of Ramanujan conjecture?
In terms of L-functions attached to automorphic irreducible cuspidal representations of $GL_{m}$ over $\mathbb{Q}$.
Jun
26
asked Does unique factorization for automorphic L-functions imply a weakened form of Ramanujan conjecture?
Jun
5
revised About Goldbach's conjecture
added 4 characters in body
Jun
5
revised About Goldbach's conjecture
added 595 characters in body
May
27
comment Automorphisms of a differential field and transcendence degree
Thann you for your comment. It seems that the answer to my question is positive, maybe you can turn your comment into an answer so that I can accept it.
May
25
comment Differences associated with differences of primes: are they all 1,2,3?
I may be wrong, but I think a positive answer to your question could be a first step towards a solution of the so-called Proth-Gilbreath conjecture.
May
24
asked Automorphisms of a differential field and transcendence degree
May
23
comment How did Cole factor $2^{67}-1$ in 1903
Perhaps mathematicians of these times relied more on their own intuition than we do...Rigor makes your path secure and accurate but intuition makes you walk way faster.
May
22
comment what is exactly the difference between the Selberg class and the set of Artin L-functions?
Thank you very much for these really enlightening details. It's too bad I can't accept two answers to only one question!
May
22
accepted what is exactly the difference between the Selberg class and the set of Artin L-functions?
May
22
asked what is exactly the difference between the Selberg class and the set of Artin L-functions?