Zeta functions for the suspended flow
Multifractal zeta functions
... 1.2 Subshifts of finite type We will do a lot of work in settings of a certain type of subshift of finite type. As we will see, there are various theorems that show that in order to investigate multifractal spectra of ...
95
Mixed Zeta Functions
... Mixed Zeta Functions Abstract We examine Dirichlet series which combine the data of a distance function, u, a homogeneous degree zero weighting function, and a multivariable Dirichlet series, ...such ...
86
Zeta functions in triangulated categories
... ON ZETA FUNCTIONS IN TRIANGULATED CATEGORIES ...motivic zeta function in distinguished triangles in Voevodsky’s category DM ...motivic zeta functions for all varieties whose motives are ...
14
Time-changes preserving zeta functions
... the zeta function of the dynamical system with periodic point data given by time- changing the Lucas sequence along the squares, and so is integral as con- jectured in the Online Encyclopedia of Integer ...
15
Riemann’s Zeta and Two Arithmetic Functions
... ———————————– In Chapter 1 we provide knowledge on the zeta-function that is relevant to this work. In Chapter 2, we prove a preliminary result that is needed and present a bird’s-eye view of the approach we have ...
82
Fundamental Domains of Gamma and Zeta Functions
... two functions, let us illustrate the method of fundamental domains on the elementary function w fz cos z presented in 1, page 98- 99, with the interpretation of the facts proper to this ...the functions U k ...
22
Multifractal spectra and multifractal zeta functions
... multifractal zeta- functions providing precise information of very general classes of multifractal spectra, including, for example, the spectra f μ and f μ c of self-similar multifrac- tal measures ...these ...
62
Computing Zeta Functions of Nondegenerate Curves
... Abstract. In this paper we present a p-adic algorithm to compute the zeta func- tion of a nondegenerate curve over a finite field using Monsky-Washnitzer coho- mology. The paper vastly generalizes previous work ...
41
RATIONAL VALUES OF WEIERSTRASS ZETA FUNCTIONS
... Weierstrass zeta function, to which the methods of [1,3] do not ...Weierstrass zeta functions in general (and do not require that they have rational ...
14
Hyperbolic systems, zeta functions and other friends
... the flow is then done by analogy with the well known approach of Adler-Weiss constructing Markov partitions for linear hyperbolic toral automorphisms [1], ...
39
Definable equivalence relations and zeta functions of groups
... representation zeta function then follows from the usual arguments of semi-simple compact p-adic ...representation zeta functions are rational and satisfy a local functional equation [70] (in fact, ...
89
Air flow around suspended cables
... 3. Results and discusion The wind around the cable, that is modeled as smooth cylinder, of infinite length of circle and ellipse section was analysed. Diameter of the circle is 120mm, for ellipse: major diameter is 180mm ...
6
Discrete limit theorems for Estermann zeta-functions. I
... Antanas Laurinˇ cikas and Renata Macaitien ˙e Communicated by V. V. Kirichenko In honour of the 65th birthday of Professor V. V. Kirichenko Abstract. A discrete limit theorem in the sense of weak convergence of ...
18
Discrete limit theorems for Estermann zeta-functions. II
... convergence of probability measures in the space of meromorphic functions for the Estermann zeta-function with explicitly given the limit measure is proved.. 2000 Mathematics Subject Cla[r] ...
15
CiteSeerX — Zeta Functions For Curves And Log Canonical Models
... ZETA FUNCTIONS FOR CURVES AND LOG CANONICAL MODELS Willem Veys ...topological zeta function and Igusa's local zeta function are respectively a geometrical invariant associated to a complex ...
19
THE LOCAL AND GLOBAL ZETA FUNCTIONS OF GAUSS S CURVE
... THE LOCAL AND GLOBAL ZETA FUNCTIONS OF GAUSS’S CURVE BETH MALMSKOG AND JEREMY MUSKAT ABSTRACT. The singular curve C ⊂ P 2 defined over F p for a prime p by the equation x 2 t 2 + y 2 t 2 + x 2 y 2 − t 4 = 0 ...
11
Special Values of Zeta-Functions for Proper Regular Arithmetic Surfaces
... Meanwhile Flach and Morin gave conjectural descriptions of the special values of arithmetic ζ-functions ζp X , sq associated to any proper regular arithmetic scheme X Ñ Spec Z in [8]. They proved that under ...
115
The Ruelle operator, zeta functions and the asymptotic distribution of closed orbits
... In the first section of Chapter Three we give a relationship between periodic points and certain equilibrium states for sub3hifts of finite type. We next study geodesic flows on surfaces of constant negative curvature. ...
128
A converse theorem for double Dirichlet series and Shintani zeta functions
... Shintani zeta functions [13] which arise in the theory of prehomogeneous vector spaces are actually linear combinations of Mellin transforms of metaplectic Eisenstein series on ...
22
CiteSeerX — Lower bound for the poles of Igusa’s p-adic zeta functions
... Abstract Let K be a p-adic field, R the valuation ring of K, P the maximal ideal of R and q the cardinality of the residue field R/P . Let f be a polynomial over R in n > 1 variables and let χ be a character of R × . ...
10