Analytic number theory and part of the spectral theory of operators (differential, pseudo-differential, elliptic, etc.) are being merged under amore general analytic theory of regularized products of certain sequences satisfying a few basic axioms. The most basic examples consist of the sequence of natural numbers, the sequence of zeros with positive imaginary part of the Riemann zeta function, and the sequence of eigenvalues, say of a positive Laplacian on a compact or certain cases of non-compact manifolds. The resulting theory is applicable to ergodic theory and dynamical systems; to the zeta and L-functions of number theory or representation theory and modular forms; to Selberg-like zeta functions; andto the theory of regularized determ...
We study (relative) zeta regularized determinants of Laplace type operators on compact conic manifol...
Basic results in the rigorous theory of weighted dynamical zeta functions or dynamically defined gen...
We prove that the resonances of long range perturbations of the (semiclassical) Laplacian are the ze...
The theory of explicit formulas for regularized products and series forms a natural continuation of ...
We apply techniques of zeta functions and regularized products theory to study the zeta determinant ...
Is it possible to give a reasonable value to the infinite product 1 × 2 × 3 × · · · × n × · · · ? In...
The zeta-regularized product of a countable sequence $\{\lambda_{k}\}\subset \mathrm{C}\backslash \{...
Zeta-function regularization is a powerful method in perturbation theory, and this book is a compreh...
This book provides a systematic account of several breakthroughs in the modern theory of zeta functi...
AbstractWe study (relative) zeta regularized determinants of Laplace type operators on compact conic...
AbstractGeneralizing a well known trace formula from linear algebra, we define a generalized determi...
This book discusses basic topics in the spectral theory of dynamical systems. It also includes two a...
Consider a space M, a map f:M\to M, and a function g:M \to {\mathbb C}. The formal power series \zet...
The Riemann hypothesis states that all nontrivial zeros of the zeta function lie in the critical lin...
ABSTRACT. The explicit formulas of Riemann and Guinad-Weil relates the set of prime numbers with the...
We study (relative) zeta regularized determinants of Laplace type operators on compact conic manifol...
Basic results in the rigorous theory of weighted dynamical zeta functions or dynamically defined gen...
We prove that the resonances of long range perturbations of the (semiclassical) Laplacian are the ze...
The theory of explicit formulas for regularized products and series forms a natural continuation of ...
We apply techniques of zeta functions and regularized products theory to study the zeta determinant ...
Is it possible to give a reasonable value to the infinite product 1 × 2 × 3 × · · · × n × · · · ? In...
The zeta-regularized product of a countable sequence $\{\lambda_{k}\}\subset \mathrm{C}\backslash \{...
Zeta-function regularization is a powerful method in perturbation theory, and this book is a compreh...
This book provides a systematic account of several breakthroughs in the modern theory of zeta functi...
AbstractWe study (relative) zeta regularized determinants of Laplace type operators on compact conic...
AbstractGeneralizing a well known trace formula from linear algebra, we define a generalized determi...
This book discusses basic topics in the spectral theory of dynamical systems. It also includes two a...
Consider a space M, a map f:M\to M, and a function g:M \to {\mathbb C}. The formal power series \zet...
The Riemann hypothesis states that all nontrivial zeros of the zeta function lie in the critical lin...
ABSTRACT. The explicit formulas of Riemann and Guinad-Weil relates the set of prime numbers with the...
We study (relative) zeta regularized determinants of Laplace type operators on compact conic manifol...
Basic results in the rigorous theory of weighted dynamical zeta functions or dynamically defined gen...
We prove that the resonances of long range perturbations of the (semiclassical) Laplacian are the ze...