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1	An Exploration of Riemann's Zeta Function and Its Application to the Theory of Prime Distribution Segarra, Elan 01 May 2006 (has links) Identified as one of the 7 Millennium Problems, the Riemann zeta hypothesis has successfully evaded mathematicians for over 100 years. Simply stated, Riemann conjectured that all of the nontrivial zeroes of his zeta function have real part equal to 1/2. This thesis attempts to explore the theory behind Riemann’s zeta function by first starting with Euler’s zeta series and building up to Riemann’s function. Along the way we will develop the math required to handle this theory in hopes that by the end the reader will have immersed themselves enough to pursue their own exploration and research into this fascinating subject. Riemann Zeta Function Theory of Prime Number Distribution
2	Theory of the generalized modified Bessel function K_{z,w}(x) and 2-adic valuations of integer sequences. January 2017 (has links) acase@tulane.edu / Modular-type transformation formulas are the identities that are invariant under the transformation α → 1/α, and they can be represented as F (α) = F (β) where α β = 1. We derive a new transformation formula of the form F (α, z, w) = F (β, z, iw) that is a one-variable generalization of the well-known Ramanujan-Guinand identity of the form F (α, z) = F (β, z) and a two-variable generalization of Koshliakov’s formula of the form F (α) = F (β) where α β = 1. The formula is generated by first finding an integral J that is comprised of an invariance function Z and evaluating the integral to give F (α, z, w) mentioned above. The modified Bessel function K z (x) appearing in Ramanujan-Guinand identity is generalized to a new function, denoted as K z,w (x), that yields a pair of functions reciprocal in the Koshliakov kernel, which in turn yields the invariance function Z and hence the integral J and the new formula. The special function K z,w (x), first defined as the inverse Mellin transform of a product of two gamma functions and two confluent hypergeometric functions, is shown to exhibit a rich theory as evidenced by a number of integral and series representations as well as a differential-difference equation. The second topic of the thesis is 2-adic valuations of integer sequences associated with quadratic polynomials of the form x 2 +a. The sequence {n 2 +a : n ∈ Z} contains numbers divisible by any power of 2 if and only if a is of the form 4 m (8l+7). Applying this result to the sequences derived from the sums of four or fewer squares when one or more of the squares are kept constant leads to interesting results, that also points to an inherent connection with the functions r k (n) that count the number of ways to represent n as sums of k integer squares. Another class of sequences studied is the shifted sequences of the polygonal numbers given by the quadratic formula, for which the most common examples are the triangular numbers and the squares. / 1 / Aashita Kesarwani Bessel functions Theta transformation formula Riemann zeta function
3	Explicit Formulas and Asymptotic Expansions for Certain Mean Square of Hurwitz Zeta-Functions: III MATSUMOTO, KOHJI, KATSURADA, MASANORI 05 1900 (has links) No description available. Riemann zeta function Hurwitz zeta function mean square asymptotic expansion
4	An introduction to the value-distribution theory of zeta-functions MATSUMOTO, Kohji January 2006 (has links) No description available. universality Riemann zeta-function limit theorem Dirichlet series density
5	Sudėtinės funkcijos universalumas / Universality of one composite function Tamašauskaitė, Ugnė 30 July 2013 (has links) Sudėtinės funkcijos universalumo įrodymas. / Bachelor thesis about universality of one composite function. Mathematics Rymano dzeta funkcija Dirichlė eilutė Voronino teorema Riemann zeta function Dirichlet series Voronin theorem
6	Ribinė teorema Rymano dzeta funkcijos Melino transformacijai / A limit theorem for the Mellin transform of the Riemann zeta-function Remeikaitė, Solveiga 02 August 2011 (has links) Darbe pateikta funkcijų tyrimo apžvalga, svarbiausi žinomi rezultatai, suformuluota problema. Pagrindinė ribinė teorema įrodoma, taikant tikimybinius metodus, analizinių funkcijų savybes, aproksimavimo absoliučiai konvertuojančiu integralu principą. / The main limit theorem is proved using probabilistic methods, the analytical functions of the properties. Mathematics Melino transformacija Rymano dzeta funkcija Ribinė teorema The Riemann zeta-function The Mellin transform A limit theorem
7	Higher Derivatives of the Hurwitz Zeta Function Musser, Jason 01 August 2011 (has links) The Riemann zeta function ζ(s) is one of the most fundamental functions in number theory. Euler demonstrated that ζ(s) is closely connected to the prime numbers and Riemann gave proofs of the basic analytic properties of the zeta function. Values of the zeta function and its derivatives have been studied by several mathematicians. Apostol in particular gave a computable formula for the values of the derivatives of ζ(s) at s = 0. The Hurwitz zeta function ζ(s,q) is a generalization of ζ(s). We modify Apostolʼs methods to find values of the derivatives of ζ(s,q) with respect to s at s = 0. As a consequence, we obtain relations among certain important constants, the generalized Stieltjes constants. We also give numerical estimates of several values of the derivatives of ζ(s,q). Riemann Zeta Function Stieltjes Constants Series expansion Functional equation Mathematics Number Theory
8	On Witten multiple zeta-functions associated with semisimple Lie algebras I Tsumura, Hirofumi, Matsumoto, Kohji January 2006 (has links) No description available. semisimple Lie algebra analytic continuation Riemann zeta-function Mordell-Tornheim zeta-functions Witten multiple zeta-functions
9	Hipótese de Riemann e física / Riemann hypothesis and physics Alvites, José Carlos Valencia 05 March 2012 (has links) Neste trabalho, introduzimos a função zeta de Riemann \'ZETA\'(s), para s \'PERTENCE\' C \\ e apresentamos muito do que é conhecido como justificativa para a hipótese de Riemann. A importância de \'ZETA\' (s) para a teoria analítica dos números é enfatizada e fornecemos uma prova conhecida do Teorema dos Números Primos. No final, discutimos a importância de \'ZETA\'(s) para alguns modelos físicos de interesse e concluimos descrevendo como a hipótese de Riemann pode ser acessada estudando estes sistemas / In this work, we introduce the Riemann zeta function \'ZETA\'(s), s \'IT BELONGS\' C \\ and present much of what is known to support the Riemann hypothesis. The importance of \'ZETA\'(s) to the Analytic number theory is emphasized and a proof for the Prime Number Theorem is reviewed. In the end, we report on the importance of \'ZETA\'(s) to some relevant physical models and conclude by describing how the Riemann Hypothesis can be accessed by studying these systems Função zeta de Riemann Função zeta de Riemann e física Hipótese de Riemann Nontrivial zeros Riemann hypothesis Riemann zeta function Riemann zeta function and physics Teorema dos números primos Theorem of prime numbers Zeros não triviais
10	Hipótese de Riemann e física / Riemann hypothesis and physics José Carlos Valencia Alvites 05 March 2012 (has links) Neste trabalho, introduzimos a função zeta de Riemann \'ZETA\'(s), para s \'PERTENCE\' C \\ e apresentamos muito do que é conhecido como justificativa para a hipótese de Riemann. A importância de \'ZETA\' (s) para a teoria analítica dos números é enfatizada e fornecemos uma prova conhecida do Teorema dos Números Primos. No final, discutimos a importância de \'ZETA\'(s) para alguns modelos físicos de interesse e concluimos descrevendo como a hipótese de Riemann pode ser acessada estudando estes sistemas / In this work, we introduce the Riemann zeta function \'ZETA\'(s), s \'IT BELONGS\' C \\ and present much of what is known to support the Riemann hypothesis. The importance of \'ZETA\'(s) to the Analytic number theory is emphasized and a proof for the Prime Number Theorem is reviewed. In the end, we report on the importance of \'ZETA\'(s) to some relevant physical models and conclude by describing how the Riemann Hypothesis can be accessed by studying these systems Função zeta de Riemann Função zeta de Riemann e física Hipótese de Riemann Teorema dos números primos Zeros não triviais Nontrivial zeros Riemann hypothesis Riemann zeta function Riemann zeta function and physics Theorem of prime numbers

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