Formula for the Taylor Series for Tetration
|
Formula for the Taylor Series for Tetration
|
06/12/2022, 06:17 AM
See tetration combinatorics for more information. The example derives \( D^4f^n(z) \). The following works for all smooth iterated functions, so it applies to tetration and the hyperoperators.
Enumerate the total partition of 65536 (not computationally practical), evaluate each enumeration and add the terms together.
Daniel
|
|
« Next Oldest | Next Newest »
|
| Messages In This Thread |
|
Formula for the Taylor Series for Tetration - by Catullus - 06/12/2022, 03:33 AM
RE: Formula for the Talor Series for Tetration - by JmsNxn - 06/12/2022, 04:24 AM
RE: Formula for the Talor Series for Tetration - by Catullus - 06/12/2022, 05:30 AM
RE: Formula for the Talor Series for Tetration - by JmsNxn - 06/12/2022, 05:53 AM
RE: Formula for the Talor Series for Tetration - by Catullus - 06/12/2022, 06:04 AM
RE: Formula for the Talor Series for Tetration - by Daniel - 06/12/2022, 06:17 AM
RE: Formula for the Talor Series for Tetration - by JmsNxn - 06/12/2022, 06:33 AM
RE: Formula for the Talor Series for Tetration - by Daniel - 06/12/2022, 06:50 AM
RE: Formula for the Talor Series for Tetration - by JmsNxn - 06/12/2022, 07:32 AM
|
