A detailed review is made on the classical concepts of General Relativity that allow us to heuristically infer a first formulation of the so-called Holographic Principle. With the study of rotating black holes and their properties related... more
A detailed review is made on the classical concepts of General Relativity that allow us to
heuristically infer a first formulation of the so-called Holographic Principle. With the study
of rotating black holes and their properties related to the area of the Event Horizon, the
Hawking Area Theorem is formally stated. We also review of the concept of Entropy to
establish the theoretical framework that justifies the connection between the horizon area
and entropy through Information Theory on what is known as the Bekenstein Entropy.
Including black holes in the laws of thermodynamics imply a generalization of the Second
Law. This postulated generalized law has as a consequence a limit in the entropy of the
Universe. Finally, under a weak interaction and spherical symmetry considerations it is
found a that the entropy of a system is bounded from above by one-fourth of the area (in
natural units) of the minimum sphere containing the system.
heuristically infer a first formulation of the so-called Holographic Principle. With the study
of rotating black holes and their properties related to the area of the Event Horizon, the
Hawking Area Theorem is formally stated. We also review of the concept of Entropy to
establish the theoretical framework that justifies the connection between the horizon area
and entropy through Information Theory on what is known as the Bekenstein Entropy.
Including black holes in the laws of thermodynamics imply a generalization of the Second
Law. This postulated generalized law has as a consequence a limit in the entropy of the
Universe. Finally, under a weak interaction and spherical symmetry considerations it is
found a that the entropy of a system is bounded from above by one-fourth of the area (in
natural units) of the minimum sphere containing the system.
Research Interests:
El día de hoy vamos a deducir la expresión que describe el movimiento de los planetas alrededor del sol, para ello, se hará uso del cálculo, y de una vez por todas demostraremos que la órbita de un planeta es cónica.