Connections are drawn between the global thermodynamical interpretation of quantum mechanics and the reductionist Cantorian-fractal space-time approach. The objective is to show the influence of the thermodynamical approach on development in both fields and to explain how Cantorian space can serve as a geometrical model for a space-time support of the thermodynamical approach to quantum mechanics. Seen through both theories, quantum mechanics could appear to be the result of a turbulent but homogeneous diffusion process in a transfinite non-smooth micro space-time with an area-like quantum ‘path’. Time symmetry breaking is then a consequence of the transfinite information barrier of Cantorian space-time. An important result found here is th...
Classically, one could imagine a completely static space, thus without time. As is known, this pictu...
In this paper the time dependence of G is presented. It is a simple consequence of the Virial Theore...
Here we introduce a non-commutative extension to statistical physics granting it the ability to asso...
In this paper we analyze some dynamical systems, whose motion is not on continuous path, but on a fr...
We derive the exact expectation value and standard deviation for the dimensionality of Cantorian spa...
In this paper we analyze classical and quantum systems, whose motion is not on classical continuous ...
A straightforward explanation of the Young's two-slit experiment of a quantum particle is obtained w...
We are going to show the link between the epsilon((infinity)) Cantorian space and the Hilbert spaces...
we use a Sierpinski space setting and subsequently we use a statistical cellular space setting. The ...
The nonadiabatic geometric phase in a time dependent quantum evolution is shown to provide an intrin...
To explain the origin of quantum behavior, we propose a fractal calculus to describe the non-local p...
In this paper we introduce Mohamed El Naschie's epsilon((infinity)) Cantorian space-time in connecti...
In this paper, we will show the consequences of the link between epsilon((infinity))and H-(infinity)...
A generalized equivalence principle is put forward according to which space-time symmetries and, int...
In this paper, an outline of an alternative to standard ΛCDM theories is presented. Specifically, in...
Classically, one could imagine a completely static space, thus without time. As is known, this pictu...
In this paper the time dependence of G is presented. It is a simple consequence of the Virial Theore...
Here we introduce a non-commutative extension to statistical physics granting it the ability to asso...
In this paper we analyze some dynamical systems, whose motion is not on continuous path, but on a fr...
We derive the exact expectation value and standard deviation for the dimensionality of Cantorian spa...
In this paper we analyze classical and quantum systems, whose motion is not on classical continuous ...
A straightforward explanation of the Young's two-slit experiment of a quantum particle is obtained w...
We are going to show the link between the epsilon((infinity)) Cantorian space and the Hilbert spaces...
we use a Sierpinski space setting and subsequently we use a statistical cellular space setting. The ...
The nonadiabatic geometric phase in a time dependent quantum evolution is shown to provide an intrin...
To explain the origin of quantum behavior, we propose a fractal calculus to describe the non-local p...
In this paper we introduce Mohamed El Naschie's epsilon((infinity)) Cantorian space-time in connecti...
In this paper, we will show the consequences of the link between epsilon((infinity))and H-(infinity)...
A generalized equivalence principle is put forward according to which space-time symmetries and, int...
In this paper, an outline of an alternative to standard ΛCDM theories is presented. Specifically, in...
Classically, one could imagine a completely static space, thus without time. As is known, this pictu...
In this paper the time dependence of G is presented. It is a simple consequence of the Virial Theore...
Here we introduce a non-commutative extension to statistical physics granting it the ability to asso...