Thread Rating:
  • 0 Vote(s) - 0 Average
  • 1
  • 2
  • 3
  • 4
  • 5
Fractional calculus and tetration
#4
(11/19/2014, 10:54 PM)JmsNxn Wrote: My extension is also the sole extension that is bounded by where and .

The regular iteration for bases satisfies that, as it is periodic and bounded in the right halfplane.
What complex bases does it work for? Does it work for base eta?
Reply


Messages In This Thread
Fractional calculus and tetration - by JmsNxn - 11/17/2014, 09:50 PM
RE: Fractional calculus and tetration - by JmsNxn - 11/19/2014, 10:54 PM
RE: Fractional calculus and tetration - by fivexthethird - 11/20/2014, 02:56 AM
RE: Fractional calculus and tetration - by JmsNxn - 11/20/2014, 11:16 PM

Possibly Related Threads...
Thread Author Replies Views Last Post
  Isomorphism of newtonian calculus rules for Non-Newtonian (anti)derivatives of hypers Micah 4 1,667 03/02/2019, 08:23 PM
Last Post: Micah
  Math overflow question on fractional exponential iterations sheldonison 4 4,077 04/01/2018, 03:09 AM
Last Post: JmsNxn
  A calculus proposition about sum and derivative tommy1729 1 2,078 08/19/2016, 12:24 PM
Last Post: tommy1729
  [MSE] Fixed point and fractional iteration of a map MphLee 0 2,225 01/08/2015, 03:02 PM
Last Post: MphLee
  Theorem in fractional calculus needed for hyperoperators JmsNxn 5 6,842 07/07/2014, 06:47 PM
Last Post: MphLee
  Further observations on fractional calc solution to tetration JmsNxn 13 14,565 06/05/2014, 08:54 PM
Last Post: tommy1729
  Negative, Fractional, and Complex Hyperoperations KingDevyn 2 6,540 05/30/2014, 08:19 AM
Last Post: MphLee
  left-right iteraton in right-divisible magmas, and fractional ranks. MphLee 1 2,963 05/14/2014, 03:51 PM
Last Post: MphLee
  A new way of approaching fractional hyper operators JmsNxn 0 3,965 05/26/2012, 06:34 PM
Last Post: JmsNxn
  Fractional Tetration bobsmyuncle 1 3,957 02/20/2012, 01:04 PM
Last Post: nuninho1980



Users browsing this thread: 1 Guest(s)