Thread Rating:
  • 0 Vote(s) - 0 Average
  • 1
  • 2
  • 3
  • 4
  • 5
Constructing real tetration solutions
#3
(12/22/2019, 10:28 PM)bo198214 Wrote: Yes, Daniel that's the Kneser-Solution and many of the other methods discussed here are real-analytic solutions based on the primary complex fixed points.

Yes, I'm now familiar with Kneser's approach thanks to your exposition of his work. I was thinking in terms of a countable number of fixed points, but given Kneser's work my requirement might be overkill.  
Daniel
Reply


Messages In This Thread
Constructing real tetration solutions - by Daniel - 12/22/2019, 10:53 AM
RE: Constructing real tetration solutions - by Daniel - 12/23/2019, 02:52 AM

Possibly Related Threads...
Thread Author Replies Views Last Post
  b^b^x with base 0<b<e^-e have three real fixpoints Gottfried 1 2,646 11/07/2017, 11:06 AM
Last Post: sheldonison
  2 real fixpoints again ....... tommy1729 10 10,210 02/23/2016, 10:17 PM
Last Post: tommy1729
  on constructing hyper operations for bases > eta JmsNxn 1 3,015 04/08/2015, 09:18 PM
Last Post: marraco
  A new set of numbers is necessary to extend tetration to real exponents. marraco 7 10,192 03/19/2015, 10:45 PM
Last Post: marraco
  Real-analytic tetration uniqueness criterion? mike3 25 23,497 06/15/2014, 10:17 PM
Last Post: tommy1729
  About real limits tommy1729 1 2,641 09/23/2013, 09:24 PM
Last Post: tommy1729
  Solutions to f ' (x) = f(f(x)) ? tommy1729 1 2,533 08/12/2013, 12:10 AM
Last Post: tommy1729
  Real and complex behaviour of the base change function (was: The "cheta" function) bo198214 39 56,245 08/13/2011, 06:33 PM
Last Post: bo198214
  Imaginary zeros of f(z)= z^(1/z) (real valued solutions f(z)>e^(1/e)) Gottfried 91 100,571 03/03/2011, 03:16 PM
Last Post: Gottfried
  Constructing the "analytical" formula for tetration. mike3 13 19,173 02/10/2011, 07:35 AM
Last Post: mike3



Users browsing this thread: 1 Guest(s)