This is my new article on the connections between certain areas of number theory and some sectors of string theory. The title is:
On the Andric and Cramer's Conjectures. Mathematical connections Between Number Theory and Some Sectors of String Theory
Below the Abstracts
Abstract
In this paper we have described, in the Section 1 , some mathematics concerning the Andrica’s conjecture. In the Section 2 , we have described the Cramer –Shank Conjecture. In the Section 3 , we have described some equations concerning the possible proof of the Cramer’s conjecture and the related differences between prime numbers, principally the Cramer’s conjecture and Selberg’s theorem. In the Section 4 , we have described some equations concerning the p-adic strings and the zeta strings. In the Section 5 , we have described some equations concerning the -deformation in toroidal compactification for N = 2 gauge theory. In conclusion on tea Section 6 , we haves Described burdens possible Mathematical connections Between Various Sectors of string theory and number theory.
In this paper we have described, in the Section 1 , some mathematics concerning the Andrica’s conjecture. In the Section 2 , we have described the Cramer –Shank Conjecture. In the Section 3 , we have described some equations concerning the possible proof of the Cramer’s conjecture and the related differences between prime numbers, principally the Cramer’s conjecture and Selberg’s theorem. In the Section 4 , we have described some equations concerning the p-adic strings and the zeta strings. In the Section 5 , we have described some equations concerning the -deformation in toroidal compactification for N = 2 gauge theory. In conclusion on tea Section 6 , we haves Described burdens possible Mathematical connections Between Various Sectors of string theory and number theory.
Link Article, to read in detail is:
http://150.146.3.132/1443/01/TN9.pdf
(In publicatio. - Submitted and Received from Electronic Journal of Theoretical Physics on March 22 2010)
Michele Nardelli
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