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15 sats \ 1 reply \ @south_korea_ln 30 Jul \ on: A Chronophysics Theory science

What are your units here?

\Delta t = (-\nabla\phi_t) \cdot |(\vec{T} \times \vec{p})|

I checked your GitHub, how did you go from the

\phi_t

to the

\nabla\phi_t

version without changing anything else?

I might be completely off the mark, I know this kind of stuff often puts constants to 1. But I haven't done any of this since grad school. Not my field of expertise, at all.

0 sats \ 0 replies \ @noknees OP 30 Jul

It's not that I know too much about it either, I'm just studying it, so got a chain of thoughts in my mind, I still have a long way to go :)

The required unit of chronal potential $\phi_t$ would be $\frac{s}{kg \cdot m}$ If we accept these units for the chronal potential, it means:

Chronal potential is a measure of how time flows per unit of momentum-space displacement.

It inversely scales with mass and position, implying heavier or faster-moving objects dampen the local time flow (sounds heretical to Minkowski and Schwarzschild metrics)

Oh maybe I didn't explain properly, thanks to that, I got caught up in the thought and forgot to define chronal field vector

\vec{C} = -\nabla\phi_t

so it becomes

\Delta t = \vec{C} \cdot |(\vec{T} \times \vec{p})|

so maybe,

\Delta t = \int_{a}^{b} \vec{C}\, \vec{dl}