Consider a space M, a map f:M\to M, and a function g:M \to {\mathbb C}. The formal power series \zeta (z) = \exp \sum ^\infty _{m=1} \frac {z^m}{m} \sum _{x \in \mathrm {Fix}\,f^m} \prod ^{m-1}_{k=0} g (f^kx) yields an example of a dynamical zeta function. Such functions have unexpected analytic properties and interesting relations to the theory of dynamical systems, statistical mechanics, and the spectral theory of certain operators (transfer operators). The first part of this monograph presents a general introduction to this subject. The second part is a detailed study of the zeta functions associated with piecewise monotone maps of the interval [0,1]. In particular, Ruelle gives a proof of a generalized form of the Baladi-Keller theorem ...
In this note, we show a polynomial bound for the growth of the lap number of a piecewise monotone an...
AbstractWe consider a family of isometric extensions of the full shift onpsymbols (forpa prime) para...
This paper establishes new bridges between number theory and modern harmonic analysis, namely betwee...
The spectra of transfer operators associated to dynamical systems, when acting on suitable Banach sp...
Basic results in the rigorous theory of weighted dynamical zeta functions or dynamically defined gen...
AbstractA dynamical zeta function is proposed for the subshift on an countable set. It is shown that...
: We study piecewise monotone and piecewise continuous maps f from a rooted oriented tree to itself,...
AbstractA symbolic dynamical zeta function for subshifts over a countable alphabet is analyzed. We p...
AbstractGeneralizing a well known trace formula from linear algebra, we define a generalized determi...
We consider a family of isometric extensions of the full shift on p symbols (for p a prime) parametr...
none1noDynamical zeta functions provide a powerful method to analyse low-dimensional dynamical syste...
Abstract. We survey some recent progress in the theory of dynamical zeta-functions and explain its i...
Baake M, Lau E, Paskunas V. A note on the dynamical zeta function of general toral endomorphisms. Mo...
In this paper we discuss a sort of zeta function which describes the behavior of periodic points of ...
I show that the Ruelle dynamical zeta function, associated to an Anosov diffeomorphism, is the Fredh...
In this note, we show a polynomial bound for the growth of the lap number of a piecewise monotone an...
AbstractWe consider a family of isometric extensions of the full shift onpsymbols (forpa prime) para...
This paper establishes new bridges between number theory and modern harmonic analysis, namely betwee...
The spectra of transfer operators associated to dynamical systems, when acting on suitable Banach sp...
Basic results in the rigorous theory of weighted dynamical zeta functions or dynamically defined gen...
AbstractA dynamical zeta function is proposed for the subshift on an countable set. It is shown that...
: We study piecewise monotone and piecewise continuous maps f from a rooted oriented tree to itself,...
AbstractA symbolic dynamical zeta function for subshifts over a countable alphabet is analyzed. We p...
AbstractGeneralizing a well known trace formula from linear algebra, we define a generalized determi...
We consider a family of isometric extensions of the full shift on p symbols (for p a prime) parametr...
none1noDynamical zeta functions provide a powerful method to analyse low-dimensional dynamical syste...
Abstract. We survey some recent progress in the theory of dynamical zeta-functions and explain its i...
Baake M, Lau E, Paskunas V. A note on the dynamical zeta function of general toral endomorphisms. Mo...
In this paper we discuss a sort of zeta function which describes the behavior of periodic points of ...
I show that the Ruelle dynamical zeta function, associated to an Anosov diffeomorphism, is the Fredh...
In this note, we show a polynomial bound for the growth of the lap number of a piecewise monotone an...
AbstractWe consider a family of isometric extensions of the full shift onpsymbols (forpa prime) para...
This paper establishes new bridges between number theory and modern harmonic analysis, namely betwee...