Explicit Formulas and Asymptotic Expansions for Certain Mean Square of Hurwitz Zeta-Functions: III

MATSUMOTO, KOHJI, KATSURADA, MASANORI

05 1900

No description available.

Riemann zeta function

Hurwitz zeta function

mean square

asymptotic expansion

Joint universality of zeta-functions with periodic coefficients / Dzeta funkcijų su periodiniais koeficientais jungtinis universalumas

Račkauskienė, Santa

14 December 2012

In the thesis, the joint universality of periodic Hurwitz zeta-functions as well as that jointly with the Riemann zeta-functions of normalized cusp forms is obtained. / Darbe yra įrodomas jungtinis universalumas periodinėms Hurvico dzeta funkcijoms, taip pat bendras universalumas su Rymano dzeta funkcija ir normuotų parabolinių formų dzeta funkcija.

Mathematics

Limit theorem

Periodic Hurwitz zeta-function

Universality

Joint universality

Ribinė teorema

Periodinė Hurvico dzeta funkcija

Universalumas

Jungtinis universalumas

Dzeta funkcijų su periodiniais koeficientais jungtinis universalumas / Joint universality of zeta-functions with periodic coefficients

Račkauskienė, Santa

14 December 2012

Darbe yra įrodomas jungtinis universalumas periodinėms Hurvico dzeta funkcijoms, taip pat bendras universalumas su Rymano dzeta funkcija ir normuotų parabolinių formų dzeta funkcija. / In the thesis, the joint universality of periodic Hurwitz zeta-functions as well as that jointly with the Riemann zeta-function or zeta functions of normalized cusp forms is obtained.

Mathematics

Ribinė teorema

Periodinė Hurvico dzeta funkcija

Universalumas

Jungtinis universalumas

Limit theorem

Periodic Hurwitz zeta-function

Universality

Joint universality

Diskrečioji ribinė teorema su svoriu Hurvico dzeta funkcijai su algebriniu iracionaliuoju parametru / Weighted discrete limit theorem for the Hurwitz zeta-function with algebraic irrational parameter

Makulavičius, Algirdas

02 July 2012

Darbe nagrinėjamos Hurvico dzeta funkcijos _dzeta(s; alfa_), s = _alfa +it su algebriniu iracionaliuoju parametru _alfa, 0 < alfa_ ≤ 1 diskretusis reikšmių pasiskirstymas. Įrodyta, jog funkcijai _(s; alfa_) galioja diskrečioji ribinė teorema su svoriu kompleksinėje plokštumoje C. / Master’s work is devoted to the investigation of value distribution of Hurwitz zeta-function _(s; alfa_), s = alfa_ + it with algebraic irrational parameter alfa_, 0 < alfa_ ≤ 1. It is proved that for the function _(s; alfa_) valid discrete limit theorem with weight in the complex plane.

Mathematics

Diskrečioji ribinė teorema

Hurvico dzeta funkcija

Algebrinis iracionalus parametras

Weighted discrete limit theorem

Hurwitz zeta-function

Algebraic irrational parameter

Analysis in fractional calculus and asymptotics related to zeta functions

Fernandez, Arran

January 2018

This thesis presents results in two apparently disparate mathematical fields which can both be examined -- and even united -- by means of pure analysis. Fractional calculus is the study of differentiation and integration to non-integer orders. Dating back to Leibniz, this idea was considered by many great mathematical figures, and in recent decades it has been used to model many real-world systems and processes, but a full development of the mathematical theory remains incomplete. Many techniques for partial differential equations (PDEs) can be extended to fractional PDEs too. Three chapters below cover my results in this area: establishing the elliptic regularity theorem, Malgrange-Ehrenpreis theorem, and unified transform method for fractional PDEs. Each one is analogous to a known result for classical PDEs, but the proof in the general fractional scenario requires new ideas and modifications. Fractional derivatives and integrals are not uniquely defined: there are many different formulae, each of which has its own advantages and disadvantages. The most commonly used is the classical Riemann-Liouville model, but others may be preferred in different situations, and now new fractional models are being proposed and developed each year. This creates many opportunities for new research, since each time a model is proposed, its mathematical fundamentals need to be examined and developed. Two chapters below investigate some of these new models. My results on the Atangana-Baleanu model proposed in 2016 have already had a noticeable impact on research in this area. Furthermore, this model and the results concerning it can be extended to more general fractional models which also have certain desirable properties of their own. Fractional calculus and zeta functions have rarely been united in research, but one chapter below covers a new formula expressing the Lerch zeta function as a fractional derivative of an elementary function. This result could have many ramifications in both fields, which are yet to be explored fully. Zeta functions are very important in analytic number theory: the Riemann zeta function relates to the distribution of the primes, and this field contains some of the most persistent open problems in mathematics. Since 2012, novel asymptotic techniques have been applied to derive new results on the growth of the Riemann zeta function. One chapter below modifies some of these techniques to prove asymptotics to all orders for the Hurwitz zeta function. Many new ideas are required, but the end result is more elegant than the original one for Riemann zeta, because some of the new methodologies enable different parts of the argument to be presented in a more unified way. Several related problems involve asymptotics arbitrarily near a stationary point. Ideally it should be possible to find uniform asymptotics which provide a smooth transition between the integration by parts and stationary phase methods. One chapter below solves this problem for a particular integral which arises in the analysis of zeta functions.

Joint universality for periodic Hurwitz zeta-functions / Periodinių Hurvico dzeta funkcijų jungtinis universalumas

Skerstonaitė, Santa

27 August 2009

The aim of our work is to obtain joint universality theorems for periodic Hurwitz zeta-functions. We prove two joint universality theorems for periodic Hurwitz zeta-function. In the first theorems, the set L is linearly independent over the field of national numbers, then the periodic Hurwitz zeta-functions are universality. In the second joint universality theorem, we consider the use then parameter alpha corresponds general periodic sequence. Then the set L is linearly independent over the field of national numbers and the rank hypothesis in this theorem is weaker then that in A. Laurinčikas (2008) work. Then the second periodic Hurwitz zeta-functions are universal too. / Magistro darbe yra nagrinėjamas Hurvico dzeta funkcijų rinkinio jungtinis universalumas. Yra įrodytos dvi jungtinės universalumo teoremos. Pirmoji teorema tvirtina, kad jei aibė L yra tiesiškai nepriklausoma virš racionaliųjų skaičių kūno, tai periodinės Hurvico dzeta funkcijos yra universalios. Ši teorema žymiai susilpnina sąlygas, kurioms esant, buvo gautas analogiškas rezultatas A. Javtoko ir A. Laurinčiko 2008 m. darbe. Antroje teoremoje yra nagrinėjamas atvejis, kai kiekvieną skaičių alpha atitinka periodinių sekų rinkinys. Kai sistema L yra tiesiškai nepriklausoma virš racionaliųjų skaičių kūno ir galioja vieno rango tipo sąlyga, silpnesnė negu A. Laurinčiko darbe (2008), tai periodinių Hurvico dzeta funkcijų rinkinys yra taip pat universalus.

Mathematics

Limit theorem

Periodic Hurwitz zeta-function

Probability measure

Universality

Weak convergence

Ribinė teorema

Periodinė Hurvico dzeta funkcija

Tikimybinis matas

Universalumas

Silpnasis konvergavimas