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Entropy and Geometric Objects
- Source :
- Entropy, Vol 20, Iss 6, p 453 (2018), Entropy, Volume 20, Issue 6, Proceedings / MDPI AG 2(5), 153 (2018). doi:10.3390/ecea-4-05007 special issue: "Proceedings, 2018, ECEA-4 2017 : The 4th International Electronic Conference on Entropy and Its Applications ; Online, 21 November-1 December 2017 / Issue Editors: Prof. Dr. Philip Broadbridge", 4. International Electronic Conference on Entropy and Its Applications, ECEA 2017, online, 2017-11-21-2017-12-01, Proceedings, Vol 2, Iss 4, p 153 (2017), Multidisciplinary Digital Publishing Institute, Preprints.org, DOAJ-Articles, Proceedings
- Publication Year :
- 2018
- Publisher :
- RWTH Aachen University, 2018.
-
Abstract
- Different notions of entropy can be identified in different scientific communities: (i) the thermodynamic sense<br />(ii) the information sense<br />(iii) the statistical sense<br />(iv) the disorder sense<br />and (v) the homogeneity sense. Especially the &ldquo<br />disorder sense&rdquo<br />and the &ldquo<br />homogeneity sense&rdquo<br />relate to and require the notion of space and time. One of the few prominent examples relating entropy to both geometry and space is the Bekenstein-Hawking entropy of a Black Hole. Although this was developed for describing a physical object&mdash<br />a black hole&mdash<br />having a mass, a momentum, a temperature, an electrical charge, etc., absolutely no information about this object&rsquo<br />s attributes can ultimately be found in the final formulation. In contrast, the Bekenstein-Hawking entropy in its dimensionless form is a positive quantity only comprising geometric attributes such as an area A&mdash<br />the area of the event horizon of the black hole, a length LP&mdash<br />the Planck length, and a factor 1/4. A purely geometric approach to this formulation will be presented here. The approach is based on a continuous 3D extension of the Heaviside function which draws on the phase-field concept of diffuse interfaces. Entropy enters into the local and statistical description of contrast or gradient distributions in the transition region of the extended Heaviside function definition. The structure of the Bekenstein-Hawking formulation is ultimately derived for a geometric sphere based solely on geometric-statistical considerations.
- Subjects :
- 0209 industrial biotechnology
Event horizon
Dirac delta function
General Physics and Astronomy
02 engineering and technology
Astrophysics
Space (mathematics)
01 natural sciences
gradient-entropy
010305 fluids & plasmas
phase-field models
020901 industrial engineering & automation
Dirac function
Statistical physics
lcsh:Science
Computer Science::Databases
Mathematics
Physics
Heaviside step function
H-theorem
Principle of maximum entropy
Bekenstein bound
diffuse interfaces
3D delta function
lcsh:QC1-999
QB460-466
Classical mechanics
Maximum entropy probability distribution
symbols
Planck length
entropy of geometric objects
Science
QC1-999
lcsh:A
lcsh:Astrophysics
Computer Science::Digital Libraries
General Works
Article
Differential entropy
Entropy (classical thermodynamics)
symbols.namesake
General Relativity and Quantum Cosmology
0103 physical sciences
lcsh:QB460-466
010306 general physics
Heaviside function
Spacetime
Homogeneity (statistics)
010401 analytical chemistry
Maximum entropy thermodynamics
Bekenstein-Hawking entropy
contrast
astronomy_astrophysics
Quantum relative entropy
0104 chemical sciences
Black hole
lcsh:Q
lcsh:General Works
ddc:600
Joint quantum entropy
lcsh:Physics
Subjects
Details
- Language :
- English
- Database :
- OpenAIRE
- Journal :
- Entropy, Vol 20, Iss 6, p 453 (2018), Entropy, Volume 20, Issue 6, Proceedings / MDPI AG 2(5), 153 (2018). doi:10.3390/ecea-4-05007 special issue: "Proceedings, 2018, ECEA-4 2017 : The 4th International Electronic Conference on Entropy and Its Applications ; Online, 21 November-1 December 2017 / Issue Editors: Prof. Dr. Philip Broadbridge", 4. International Electronic Conference on Entropy and Its Applications, ECEA 2017, online, 2017-11-21-2017-12-01, Proceedings, Vol 2, Iss 4, p 153 (2017), Multidisciplinary Digital Publishing Institute, Preprints.org, DOAJ-Articles, Proceedings
- Accession number :
- edsair.doi.dedup.....a56ab63bfff4cfa9d357e8a079b44cd1
- Full Text :
- https://doi.org/10.18154/rwth-2018-221163