The paper deals with theoretical treatment of physical limits for computation. We are using some statements on base of min energy/bit, power delay product, Shannon entropy and Heisenberg uncertainty principle which result in about kTln(2) energy for a bit of information.
References
[1]
Markov, L.L. (2014) Limits on Fundamental Limits to Computation. Nature, 512, 147-154 https://doi.org/10.1038/nature13570
[2]
Hevesi, I. (1998) Theory of Electricity. Hungarian National Textbook Publisher, Budapest.
[3]
Baldo, M. (2011) Introduction to Nanoelectronics. MIT OpenCourseWare Publication.
[4]
Singh, A.K. (2011) Electronic Devices and Integrated Circuits. PHI Learning Pvt. Ltd., Delhi.
[5]
Stathis, J.H. (2002) Reliability Limits for the Gate Insulator in CMOS technology. IBM Journal of Research and Development, 46, 265-286. https://doi.org/10.1147/rd.462.0265
[6]
Heo, S., Barr, K. and Asanovic. K. (2003) Reducing Power Density through Activity Migration. Proceedings of the 2003 International Symposium on Low Power Electronics and Design, Seoul, 25-27 August 2003, 217-222. https://doi.org/10.1145/871506.871561
[7]
Feynman, R.P., Hey, J.G. and Allen, R.W. (1998) Feynman Lectures on Computation. Addison-Wesley Longman Publishing Co., Boston.
[8]
Shannon, C.E. (2001) A Mathematical Theory of Communication. ACM SIGMOBILE Mobile Computing and Communications Review, 5, 3-55. https://doi.org/10.1145/584091.584093
[9]
Lloyd, S. (2000) Ultimate Physical Limits to Computation. Nature, 406, 1047-1054. https://doi.org/10.1038/35023282
[10]
Bennett, C.H., and Landauer, R. (1985) The Fundamental Physical Limits of Computation. Scientific American, 253, 48-56. https://doi.org/10.1038/scientificamerican0785-48
[11]
Norton, J.D. (2005) Eaters of the Lotus: Landauer’s Principle and the Return of Maxwell’s Demon. Studies in History and Philosophy of Science Part B: Studies in History and Philosophy of Modern Physics, 36, 375-411. https://doi.org/10.1016/j.shpsb.2004.12.002
