Add to ORKGAn heuristic proof of the Riemman conjecture is proposed. It is based on the old idea of Polya-Hilbert. A discrete/fractal derivative self adjoint operator whose spectrum may contain the nontrivial zeroes of the zeta function is presented. To substantiate this heuristic proposal we show using generalized index-theory arguments, corresponding to the (fractal) spectral dimensions of fractal branes living in Cantorian-fractal space-time, how the required $negative$ traces associated with those derivative operators naturally agree with the zeta function evaluated at the spectral dimensions. The $\zeta (0) = - 1/2$ plays a fundamental role
How many fractals exist in nature or the virtual world In this work, we partially answer the second ...
We establish a version of the fractal uncertainty principle, obtained by Bourgain and Dyatlov in 201...
Based on his earlier work on the vibrations of 'drums with fractal boundary', the first au...
Abstract. A spectral reformulation of the Riemann hypothesis was obtained in [LaMa2] by the second a...
What is it? It is what it is... just kidding. First, the Riemann zeta function. It has many forms, i...
The spectral operator was introduced for the first time by M. L. Lapidus and his collaborator M. van...
The steps towards a proof of Riemann's conjecture using spectral analysis are rigorously provided. W...
Formulated in 1859, the Riemann Hypothesis is the most celebrated and multifaceted open problem in m...
This monograph gives a state-of-the-art and accessible treatment of a new general higher-dimensional...
© 2017 L & H Scientific Publishing, LLC. The authors have previously reported the existence of a mor...
The zeta-dimension of a set A of positive integers is the infimum s such that the sum of the recipro...
The zeta-dimension of a set A of positive integers is where Dimζ(A) = inf{s | ζA(s) < ∞}, ζA(s) ...
International audienceIn this paper, we generalize the zeta function for a fractal string (as in [18...
A proof of the Riemann's hypothesis (RH) about the non-trivial zeroes of the Riemann zeta-function i...
Abstract. In this note an interpretation of Riemann’s zeta function is provided in terms of an R-equ...
How many fractals exist in nature or the virtual world In this work, we partially answer the second ...
We establish a version of the fractal uncertainty principle, obtained by Bourgain and Dyatlov in 201...
Based on his earlier work on the vibrations of 'drums with fractal boundary', the first au...
Abstract. A spectral reformulation of the Riemann hypothesis was obtained in [LaMa2] by the second a...
What is it? It is what it is... just kidding. First, the Riemann zeta function. It has many forms, i...
The spectral operator was introduced for the first time by M. L. Lapidus and his collaborator M. van...
The steps towards a proof of Riemann's conjecture using spectral analysis are rigorously provided. W...
Formulated in 1859, the Riemann Hypothesis is the most celebrated and multifaceted open problem in m...
This monograph gives a state-of-the-art and accessible treatment of a new general higher-dimensional...
© 2017 L & H Scientific Publishing, LLC. The authors have previously reported the existence of a mor...
The zeta-dimension of a set A of positive integers is the infimum s such that the sum of the recipro...
The zeta-dimension of a set A of positive integers is where Dimζ(A) = inf{s | ζA(s) < ∞}, ζA(s) ...
International audienceIn this paper, we generalize the zeta function for a fractal string (as in [18...
A proof of the Riemann's hypothesis (RH) about the non-trivial zeroes of the Riemann zeta-function i...
Abstract. In this note an interpretation of Riemann’s zeta function is provided in terms of an R-equ...
How many fractals exist in nature or the virtual world In this work, we partially answer the second ...
We establish a version of the fractal uncertainty principle, obtained by Bourgain and Dyatlov in 201...
Based on his earlier work on the vibrations of 'drums with fractal boundary', the first au...