My question is simple, how can the theory of finite-sized elements (Planck-sized elements) in spacetime be correct, when you find the number $\pi$ in the Schwartzchild representation of the black hole, which implies that the black hole space-time curvature is composed of infinitely many space-time elements, as $\pi$ is a number which has infinitely many "decimals"? Clearly, the perfect ring of circumference $c$ is composed of infinitely many $\text{d}c$, and therefore the Planck limit should not exist at the space-time level, since a black hole cannot pertain to it as a subdivision of its spacetime geometry?
Asked
Active
Viewed 66 times
0
-
3see also https://physics.stackexchange.com/q/185939/50583 for more discussion of the myth that the Planck length is about length being discrete in integral multiples of it. – ACuriousMind Feb 06 '24 at 17:42
-
Comments have been moved to chat; please do not continue the discussion here. Before posting a comment below this one, please review the purposes of comments. Comments that do not request clarification or suggest improvements usually belong as an answer, on [meta], or in [chat]. Comments continuing discussion may be removed. – Buzz Feb 08 '24 at 15:54