• 0 Vote(s) - 0 Average
• 1
• 2
• 3
• 4
• 5
 Super-logarithm on the imaginary line jaydfox Long Time Fellow Posts: 440 Threads: 31 Joined: Aug 2007 11/15/2007, 09:25 AM By the way, now that I see it written down, I see that I made a simple but important mistake a few days ago, by forgetting the i in the exponents for the exponential form of the fourier series. I knew that we had real exponents for slog, but didn't quite link it up with the fact that we're periodic in the imaginary direction. ~ Jay Daniel Fox « Next Oldest | Next Newest »

 Messages In This Thread Super-logarithm on the imaginary line - by andydude - 11/15/2007, 08:40 AM RE: Super-logarithm on the imaginary line - by jaydfox - 11/15/2007, 09:08 AM RE: Super-logarithm on the imaginary line - by jaydfox - 11/15/2007, 09:25 AM RE: Super-logarithm on the imaginary line - by andydude - 11/15/2007, 05:52 PM

 Possibly Related Threads... Thread Author Replies Views Last Post Is bugs or features for fatou.gp super-logarithm? Ember Edison 10 5,956 08/07/2019, 02:44 AM Last Post: Ember Edison A fundamental flaw of an operator who's super operator is addition JmsNxn 4 8,289 06/23/2019, 08:19 PM Last Post: Chenjesu Can we get the holomorphic super-root and super-logarithm function? Ember Edison 10 6,626 06/10/2019, 04:29 AM Last Post: Ember Edison Inverse super-composition Xorter 11 16,192 05/26/2018, 12:00 AM Last Post: Xorter The super 0th root and a new rule of tetration? Xorter 4 5,290 11/29/2017, 11:53 AM Last Post: Xorter Is the straight line the shortest, really? Xorter 0 1,679 05/23/2017, 04:40 PM Last Post: Xorter Solving tetration using differintegrals and super-roots JmsNxn 0 2,366 08/22/2016, 10:07 PM Last Post: JmsNxn The super of exp(z)(z^2 + 1) + z. tommy1729 1 3,199 03/15/2016, 01:02 PM Last Post: tommy1729 Super-root 3 andydude 10 13,493 01/19/2016, 03:14 AM Last Post: andydude super of exp + 2pi i ? tommy1729 1 3,970 08/18/2013, 09:20 PM Last Post: tommy1729

Users browsing this thread: 1 Guest(s)