A Brief Commentary on Space-Time-Height Relativity
American Journal of Modern Physics
Volume 5, Issue 3, May 2016, Pages: 39-44
Received: May 8, 2016; Accepted: May 19, 2016; Published: May 30, 2016
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Soudip Sinha Roy, Department of Electronics & Communication Engineering, University of Engineering & Management, Jaipur, India
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This article contributes a mathematical visualization on the relativity among space-time-height accordingly with the A. Einstein’s special relativity theory. The variation of time with the increment and decrement of space and height is truly focused and elaborated inside. The Lorentz expression about the relativity interprets the relativity of mass correspondingly with the energy of matter. This proposed theory visualize the relativity among three dimensions at a time i.e. space, time and height. Space, time and height are taken as three individual dimensions and all 3D plots are sketched collaborating with these dimensions. To comprehend the theory several explanations are established and several expressions are derived and plotted manually. All the expressions conclude with a great satisfaction that the relativity of time also exists in the collaboration with space and height both instantaneously.
Special Relativity, Lorentz Equation, Time-Energy Relativity, Time Dilation
To cite this article
Soudip Sinha Roy, A Brief Commentary on Space-Time-Height Relativity, American Journal of Modern Physics. Vol. 5, No. 3, 2016, pp. 39-44. doi: 10.11648/j.ajmp.20160503.13
Copyright © 2016 Authors retain the copyright of this article.
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A. Einstein, N. Rosen, “The particle problem in general relativity theory”, Institute of Advance Study, Princeton, vol. 48, pp. 73-77, 1st July 1935.
A. Einstein, “Foundation of the General Theory Relativity”, vol. 6, pp. 146-200, DOC. 30, 1914-1917.
Weiskopf, D., Borchers, M., Ertl, T., Falk, M., “Explanatory and illustrative visualization of special and general relativity”, IEEE trans. on Visualization and computer graphics, vol. 12, no. 4, p. 522-534, July-Aug. 2006.
McCausland, I, “On the special theory of relativity”, proc. of the Institution of Electrical Engineers, pp. 1766-1767, Dec. 1972.
Sussman, G., Wishdom, J., Farr, W., “Special Relativity”, MIT press, pp. 256.
Harman, W. W., “Special relativity and the electron”, proc. of IRE, vol. 37, no. 11, pp. 1308-1314, Nov. 1949.
Tai, C., “Appendix E: Vector analysis in the special relativity”, Wiely-IEEE press, Edition 1, pp. 174-180, 1997.
Hsiung, P.-K., Thibadeau, R. H., Cox, C.B., Dunn, R.H.P., “Time dilation visualization in relativity”, IEEE proc. of Supercomputing ’90, pp. 835-844, 12-16 Nov. 1990.
Winkler, G. M. R., “Synchronization and relativity”, proc. of IEEE, vol. 79, no. 7, pp. 1029-1039, July 1991.
Renshaw, C., “Moving clocks, reference frames and the twin paradox”, IEEE trans. on Aerospace and Electronic systems Magazine, vol. 11, no. 1, pp- 27-31, Jan. 1996.
Nelson, Robart A., “Relativistic time transfer in Solar system”, IEEE international proc. on Frequency control symposium, 2007 joint with the 21th European Frequency and Time Forum, Geneva, pp. 1278-1283.
Reed, I. S., “Wave packet with special relativity demonstrating quantum rules, Schrodinger’s equation and propagator integral”, IEE proc. on Science, Measurement Technology, vol. 138, no. 4, pp. 223-236, July 1991.
Haradhon Kumar Mohajan, “Space-Time Singularities and Raychaudhuri equations”, Journal of Natural Science, vol. 1, no. 2, pp. 18-30, Dec. 2013. Available at www.aripd.org/jns.
Friedman, M., Serlin, V., Lau, Y. Y., Krall, J., “The physics and applications of modulated intense relativistic electron beams”, IEEE proc. of 8th International Conference on High-Power Particle Beams, Novosibirsk, pp. 53-6-, 2-5 July 1990.
John Kogut, Washington, D. C., “Introduction to Relativity”, ISBN: 978-0-12-417561-7, April 2001. Available at https://www.elsevier.com.
G. Kaiser, Lowell, MA, “Quantum physics, Relativity and Complex space-time” ISBN: 978-0-444-88465-7, Dec. 1990. Available at https://www.elsevier.com.
Li, T. G. F., et al.: Towards a generic test of the strong field dynamics of general relativity using compact binary coalescence. Phys. Rev. D 85, 082003 (2012).
M. D. KRUSKAL'f, “Maximal Extension of Schwarzschild Metric”, vol. 119, no. 5, pp. 1743-1745, 1st Sept. 1960. Available at www.springeropen.com.
M. Alcubierre, “The Warp Drive: Hyper-Fast Travel within General Relativity,” Classical and Quantum Gravity, vol. 11, pp. L73-L77, 1994.
T. Ertl, F. Geyer, H. Herold, U. Kraus, R. Niemeier, H.-P. Nollert, A. Rebetzky, H. Ruder, and G. Zeller, “Visualization in Astrophysics,” Proc. Eurographics, pp. 149-158, 1989.
D. Weiskopf, “Four-Dimensional Non-Linear Ray Tracing as a Visualization Tool for Gravitational Physics,” Proc. IEEE Conf. Visualization, pp. 445-448, 2000.
D. Ebert and P. Rheingans, “Volume Illustration: Non-Photorealistic Rendering of Volume Models,” Proc. EEE Conf. Visualization, pp. 195-202, 2000.
Gerald Gwinner, “Experimental tests of time dilation in space relativity”, trans. of Worlds Scientific on modern physics letter A, vol. 20, no. 11, pp. 791-805, April 2005.
Radwan M. Kassir, “On the relativistic length Contranction and Special Relativity: Twisted conceptios”, the general science journal, pp. 1-5, 2015.
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