2016-Sustainable Industrial Processing Summit
SIPS 2016 Volume 4: Santilli Intl. Symp. / Mathematics Applications
| Editors: | Kongoli F, Gaines G, Georgiev S, Bhalekar A |
| Publisher: | Flogen Star OUTREACH |
| Publication Year: | 2016 |
| Pages: | 320 pages |
| ISBN: | 978-1-987820-42-3 |
| ISSN: | 2291-1227 (Metals and Materials Processing in a Clean Environment Series) |
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Applications of Isodual numbers in R.M. Santilli’s Isorelativity
Tushar Shelke1;1K.D.K.COLLEGE OF ENGINEERING, NAGPUR, Nagpur, India;
Type of Paper: Regular
Id Paper: 315
Topic: 38
Abstract:
Prof. R.M. Santilli introduced new numbers based on a certain axiom-preserving generalization of multiplication that are today known as isotopic numbers or isonumbers.
In 1965, Prof. R.M.Santilli presented the “No Reduction Theorems” according to which a macroscopic extended system in nonconservative conditions (such as a satellite during re-entry in our atmosphere) cannot be consistently reduced to a finite number of point-particles under potential forces. Also a finite number of quantum particles (that is, point-like) under potential interactions cannot consistently recover a macroscopic nonconservative system.
Literature survey reveals that, previous relativistic theories cannot provide a reliable classical explanation of antiparticles because they do not acknowledge the distinction between neutral matter and antimatter. Knowledge of the isoscattering theory requires a study of the experimental verification of isorelativity at the classical and operator levels. Moreover, as far as charged antiparticles are concerned, they lead to unpredictable quantum images consisting of particles. Hence, the whole antimatter content of the universe cannot be convincingly preserved through special and general relativity.
Prof. R.M.Santilli introduces isodual numbers in order to explain the concept of relativity for the matter and antimatter. In this paper isodual numbers are used to study isorelativity and its applications.