COVID-19: A Physical Model
Autor: | K. W. Wong, Wan K. Chow, Peter C. W. Fung |
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Rok vydání: | 2020 |
Předmět: |
Surface (mathematics)
Physics Coronavirus disease 2019 (COVID-19) Structure (category theory) Lie group 030218 nuclear medicine & medical imaging 03 medical and health sciences Theoretical physics 0302 clinical medicine Fractal 030220 oncology & carcinogenesis Core (graph theory) Representation (mathematics) Realization (systems) |
Zdroj: | Open Journal of Biophysics. 10:88-95 |
ISSN: | 2164-5396 2164-5388 |
Popis: | The coronavirus structure is explained as a fractal representation of the Poincare sphere of proteins, dotted with t-spikes having the geometric realization of the SU(3) Lie group for the protein spike, and encompasses an RNA of SU(2) topologies representations, while within the core contains a virus DNA. Through this suggested model, the virus must possess a critical temperature Tc, induced by the EEM mechanism for the completion of the Poincare sphere surface. Thus above Tc it will disintegrate. We then discuss how the virus transmission progresses within the patient’s body, and explain a very fast recent detection method currently used consistent with this model, as well as a corresponding possible cure based on this same principle of the body’s immune system. Hopefully the model can be also used as a guide to finding possible medications, so far is lacking. |
Databáze: | OpenAIRE |
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