Time Hypothesis
Authors/Creators
Description
Across the major branches of physics, the treatment of time varies significantly, suggesting that time may not be a fundamental, universal quantity. In classical mechanics, time is absolute and external: a uniform parameter against which motion is measured. In special and general relativity, time becomes relative—dilated by velocity or gravitational fields—yet remains a coordinate of a fixed space-time manifold. In quantum mechanics, time is typically treated as a classical parameter, not an operator, and its role in phenomena such as measurement, decoherence, and entanglement is often external and poorly defined.
Note: The document som_params_by_qubit.csv is from the document Quantum supremacy using a programmable superconducting processor https://doi.org/10.1038/s41586-019-1666-5
Note 2: This hypothesis is created for 3 things:
1.- To give my ideas and perspectives on time
2.- to look for work
3.- to get money to continue with my studies.
Files
time update36.pdf
Files
(5.0 MB)
| Name | Size | Download all |
|---|---|---|
|
md5:759f524600931a696871d61c1c95a4a6
|
4.6 kB | Download |
|
md5:1b5b2eef16a3e92b070077aa15a4cc79
|
918.3 kB | Preview Download |
|
md5:66d251347d313317e66192c7d8e5bfef
|
20.5 kB | Download |
|
md5:6b3db4b731e8c95ca9f0b818596b387e
|
8.0 kB | Preview Download |
|
md5:bc0e2f35c0b10a15347f84621077be38
|
3.7 MB | Preview Download |
|
md5:0006fb2110b2e6e8cf6c285c35f7b1cc
|
414.0 kB | Preview Download |
Additional details
Dates
- Created
-
2025-04-24
References
- Griffiths, D. J., & Schroeter, D. F. (2018). Introduction to quantum mechanics (3rd ed.). Cambridge University Press.
- Sakurai, J. J., & Napolitano, J. (2021). Modern quantum mechanics (3rd ed.). Cambridge University Press.
- Kondepudi, D., & Prigogine, I. (2014). Modern thermodynamics: From heat engines to dissipative structures (2nd ed.). Wiley.
- Pathria, R. K., & Beale, P. D. (2021). Statistical mechanics (4th ed.). Academic Press.
- Ryden, B. (2016). Introduction to cosmology (2nd ed.). Cambridge University Press.
- Martinis, John M.; Boixo, Sergio; Neven, Hartmut et al. (2022). Quantum supremacy using a programmable superconducting processor [Dataset]. Dryad. https://doi.org/10.5061/dryad.k6t1rj8