THERMAL SCIENCE

International Scientific Journal

Thermal Science - Online First

Authors of this Paper

External Links

online first only

Thermal science for the real world: Reality and challenge

ABSTRACT
Thermal science becomes a main tool to the search for hidden pearls in various phenomena from geoscience to nuclear energy. This article elucidates the absolute temperature in view of the geometric potential theory, which sheds a new light on many mysteries in our world, including unification of Newton's gravity and Coulomb's electronic force, quantized trajectories of planets, the Earth's inner core, prediction of the speed of light and two-scale thermodynamics. Some conjectures are suggested to elucidate relativity in view of thermodynamics.
KEYWORDS
PAPER SUBMITTED: 2019-10-01
PAPER REVISED: 2019-11-01
PAPER ACCEPTED: 2019-11-01
PUBLISHED ONLINE: 2020-05-02
DOI REFERENCE: https://doi.org/10.2298/TSCI191001177H
REFERENCES
  1. El Naschie, M. S. Derivation of the threshold and absolute temperature Tc=273.16 K from the topology of quantum space-time, Chaos, Solitons & Fractals, 14(2002), No.7, pp.1117-1120
  2. Liu, P., He, J.H., Geometric potential: An Explanation of Nanofiber's Wettability, Thermal Science, 22(2018), No.1A, pp. 33-38
  3. Jin, X., et al., Low frequency of a deforming capillary vibration, part 1: Mathematical model, Journal of Low Frequency Noise Vibration an Active Control, 38(2019), Nos.3-4, pp. 1676-1680
  4. Yang, Z.P., et al., On the cross-section of shaped fibers in the dry spinning process: Physical explanation by the geometric potential theory, Results in Physics, 14(2019), September, 102347
  5. Tian, D., et al., Geometrical potential and nanofiber membrane's highly selective adsorption property, Adsorption Science & Technology, 37(2019), Nos. 5-6, pp.367-388
  6. Li, X.-X., He, J.-H., Nanoscale adhesion and attachment oscillation under the geometric potential. Part 1: The formation mechanism of nanofiber membrane in the electrospinning, Results in Physics, 12(2019),1405-1410
  7. Wang, C.X., et al., Smart adhesion by surface treatment: Experimental and Theoretical Insights, Thermal Science, 23(2019), No.4, pp. 2355-2363
  8. He, J. H., The simpler, the better: Analytical methods for nonlinear oscillators and fractional oscillators, Journal of Low Frequency Noise Vibration and Active Control, 38(3-4)(2019) 1252-1260
  9. He, J.H., Ji, F.Y., Taylor series solution for Lane-Emden equation, Journal of Mathematical Chemistry, 57(8)(2019) 1932-1934
  10. He, J.H., A simple approach to one-dimensional convection-diffusion equation and its fractional modification for E reaction arising in rotating disk electrodes, Journal of Electroanalytical Chemistry, DOI information: 10.1016/j.jelechem.2019.113565
  11. He, C.H., et al., Taylor series solution for fractal Bratu-type equation arising in electrospinning process, Fractals, (2019) DOI: 10.1142/S0218348X20500115
  12. He JH. A simple approach to one-dimensional convection-diffusion equation and its fractional modification for E reaction arising in rotating disk electrodes, Journal of Electroanalytical Chemistry, 854(2019), Article Number: 11356. DOI information: 10.1016/j.jelechem.2019.113565
  13. Ain, Q.T., He, J.H. On two-scale dimension and its applications, Thermal Science, 23(3B)(2019): 1707-1712
  14. He,J.H. He, F.Y. Ji. Two-scale mathematics and fractional calculus for thermodynamics, Therm. Sci., 23(4)(2019) 2131-2133
  15. He, J.H. A fractal variational theory for one-dimensional compressible flow in a microgravity space, Fractals, DOI: 10.1142/S0218348X20500243