9789999327473 - proof of the riemann hypothesis: ζ(s) where s is 1/2 plus i·b, n equals infinity di dosseh-kpotogbey, robert (7 risultati)

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Paperback. Condizione: new. Paperback. The Riemann Hypothesis states that the non-trivial zeros of the Riemann zeta function z(s) lie on the critical line where the real part of s is 1/2. This work argues that conventional finite computations, even with the most powerful supercomputers, will yield imprecise solutions to the Riem…ann Hypothesis unless the computational capacity is infinite. Our research provides a mathematical approach to precisely determine the imaginary parts of these non-trivial zeros, denoted as {b}, rather than relying on experimental or approximate methods. We start with the fundamental function X2.(Y2.k3)+Y3; 0 (Eq0) as a generator for these solutions. By linking X(n)+iY(n) to {b}, we demonstrate that as n approaches infinity, zeta(s) approaches 0, with the real part a = 1/2. The methodology involves calculating b values from a specific element of zeta(s) and showing that the other part of z(s) inherently introduces a = 1/2 as n approaches +infinity. This is supported by new calculations and an extended data table (Table II). Further exploration delves into the variations of k3 and their effect on the b values. We utilize two key equations (Eq1 and Eq2) to model the behavior of the solutions. For instance, when k3 = -5, we find roots for s2 = sin(log(2) * b) near 0.988. This leads to a set of b values, such as 88.602, 79.537, and others, when k ranges from -10 to 10. Similar patterns are observed for k3 = -4, -3, -2, -1, consistently showing that the computed b values align closely with the known imaginary parts of the non-trivial zeros of rho_k (e.g., 14.134., 21.022., 25.010.). The research also examines how other values of a (the real part) can be obtained from the function k = ((-1)^(1/(1-a))-1) * n, demonstrating that a = 1/2 is a specific case where k=0. This comprehensive analysis supports the assertion that the Riemann Hypothesis can be rigorously proven by establishing a = 1/2 for any b value, thereby validating the solutions to the zeta function derived from this framework. This item is printed on demand. Shipping may be from our UK warehouse or from our Australian or US warehouses, depending on stock availability.

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Taschenbuch. Condizione: Neu. nach der Bestellung gedruckt Neuware - Printed after ordering - The Riemann Hypothesis states that the non-trivial zeros of the Riemann zeta function ¿(s) lie on the critical line where the real part of s is 1/2. This work argues that conventional finite computations, even with the most powerful sup…ercomputers, will yield imprecise solutions to the Riemann Hypothesis unless the computational capacity is infinite.Our research provides a mathematical approach to precisely determine the imaginary parts of these non-trivial zeros, denoted as {b}, rather than relying on experimental or approximate methods. We start with the fundamental function X¿2.(Y±2.k3)+Y¿3; ¿ 0 (Eq0) as a generator for these solutions. By linking X(n)+iY(n) to {b}, we demonstrate that as n approaches infinity, zeta(s) approaches 0, with the real part a = 1/2.The methodology involves calculating b values from a specific element of zeta(s) and showing that the other part of ¿(s) inherently introduces a = 1/2 as n approaches +infinity. This is supported by new calculations and an extended data table (Table II).Further exploration delves into the variations of k3 and their effect on the b values. We utilize two key equations (Eq1 and Eq2) to model the behavior of the solutions. For instance, when k3 = -5, we find roots for s2 = sin(log(2) \* b) near ± 0.988. This leads to a set of b values, such as 88.602, 79.537, and others, when k ranges from -10 to 10. Similar patterns are observed for k3 = -4, -3, -2, -1, consistently showing that the computed b values align closely with the known imaginary parts of the non-trivial zeros of rho_k (e.g., ± 14.134., ± 21.022., ± 25.010.).The research also examines how other values of a (the real part) can be obtained from the function k = ((-1)^(1/(1-a))-1) \* n, demonstrating that a = 1/2 is a specific case where k=0. This comprehensive analysis supports the assertion that the Riemann Hypothesis can be rigorously proven by establishing a = 1/2 for any b value, thereby validating the solutions to the zeta function derived from this framework.