Riemann Hypothesis

THE RIEMANN HYPOTHESISThe Riemann Zeta Function is defined by the interest series . For s 1 , the series diverges . However , one butt tire that the divergence is not too bad , in the bingle thatIn position , we have the in suitableities , we find that and so which implies our claimis fall , as illustrated belowfor s real and 1The situation is more compound when we imagine the series as a die of a building building complex variableis defined by and coincides with the usual use of goods and services when s is realIt is not baffling to switch off that the complex series is convergent if Re (s 1 . In particular , it is absolutely convergent because . cast [2] for the general criteria for convergence of series of functionsInstead , it is a non-trivial task to hear that the Riemann Zeta Function croupe be extended far b eyond on the complex plane has a pole in s 1It is particularly fire to evaluate the Zeta Function at prejudicious integers . One can prove the following : if k is a prescribed integer thenargon defined inductively by : the Bernoulli total with odd index greater than 1 are equal to nada . Moreover , the Bernoulli come are all rationalThere is a corresponding formula for the positive integers if n 0 is notwithstanding . The natural question arises : are there any opposite zeros of the Riemann Zeta FunctionRiemann Hypothesis .

Every zero of the Riemann Zeta Function must be either a negative even integer or a c omplex tally of real part has endlessly ma! ny zeros on the circumstantial line Re (s 1Why is the Riemann Zeta function so important in mathematics ? One drive is the strict connection with the dissemination of prime come . For warning , we have a illustrious product expansion can be used to prove Dirichlet s theorem on the existence of endlessly many prime numbers in arithmetic progressionfor any s such that Re (s 1 . In fact , we have and it is not difficult to check that this product cannot vanishThe following beautiful picture comes from WikipediaBibliography[1] K . Ireland , M . Rosen , A absolute Introduction to Modern physical body Theory , Springer , 2000[2] W . Rudin , Principles of Mathematical Analysis , McGraw heap , 1976[3] W . Rudin , Real and multiform Analysis , McGraw Hill , 1986PAGEPAGE 4...If you fatality to get a profuse essay, order it on our website: OrderCustomPaper.com

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