Formula is the Time?

  • The Physics Web Log forum behaves exactly like the regular forums except posts are sorted in reverse chronological order and also the originator of the blog is the only person who can post entries.
  • Prospective graduate students, current graduate students, post docs, professors, and even physics graduates working in industry encouraged to start a blog.

Kuyukov Vitaly
Posts: 1
Joined: Sun Jan 20, 2019 1:16 pm

Formula is the Time?

Postby Kuyukov Vitaly » Sun Jan 20, 2019 1:46 pm

My idea. Perhaps time can be expressed as

$$ t=\frac{Gh}{c^4}\int\frac{dS}{r} $$

Where S is the entropy of entanglement of an arbitrary closed surface. r is the radius to the surface point. Integration over a closed surface.

This is very similar to the analogy. Time behaves as a potential, and entropy as a charge.

From this formula there are several possible consequences.

1.Bekenstein Hawking entropy for the event horizon. Light cone case

$$ ct=r $$

$$ S=\frac{c^3}{Gh} r^2 $$

2.Gravitational time dilation. The case if matter inside a closed surface processes information at the quantum level according to the Margolis-Livitin theorem.

$$ dI=\frac{Mc^2t}{h} $$

$$ \Delta t=\frac{Gh}{c^4}\int\frac{dI}{r}=\frac{GMt}{c^2r} $$

3.The formula is invariant under Lorentz transformations.

4.If this definition is substituted instead of time, then the interval acquires a different look, which probably indicates a different approach of the Minkowski pseudometric with a complex plane

$$ s^2=(l^2_{p}\frac{S}{r})^2-r^2 $$

Where is the squared length of Planck

$$ l^2_{p}=\frac{Gh}{c^3} $$

Is such an interpretation possible? Sincerely, Kuyukov V.P.

Return to “Physics Web Logs (Blogs)”

Who is online

Users browsing this forum: No registered users and 1 guest