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الانظمة الاولية المعممة مع امثلة قابلة للتطبيق == The Generalized Prime Systems With Applicable Examples
Author name:
احمد عامر تايه القريشي
Supervisor name:
فائز علي راشد المعموري
General topic:
Mathematics
Specific topic:
Mathematics
Degree:
Master
University:
University of Babylon - College Of Education For Pure Sciences - Department Of Mathematics
Language:
English
University location:
Babylon
First pages:
27T1096 - p.pdf
Abstract:
Analytic Number Theory is regarded as one of the main subjects in the core of the pure mathematics. Specifically, in the Analytic Number Theory, the generalized primes and generalized integers have been investigated and formally defined in 1937 by Beurling . Beurling state that for any real sequence 〖〖{p_i}〗_ 〗_(i=1)^∞ increasing with p_1 > 1 as p_i ⟶ ∞ as i ⟶ ∞ called a Beurling primes or generalized primes. That is, p_i called generalized primes (or Beurling primes) with the fact of the fundamental theorem of arithmetic (each n = ∏_(i=1)^k▒〖p_i^(a_i )〗^ where ai ϵ N0 (= N ∪{ 0 }) forming the generalized integers . In this thesis , we investigate the Beurling prime systems and introduce example which studied firstly by the Italian author Balanzario and addressed the modification of its method.Moreover, we study the connection between the counting function of Beurling integers N_P(x) and the Beurling zeta function ζ_P(s) with a concrete examples.
