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- William Paulsen. William Paulsen, Samuel Cowgill.21 KB (3,175 words) - 23:37, 2 May 2021
- William Paulsen and Samuel Cowgill. Solving \(F(z+1)=b^{F(z)}\) in the complex plane. Advan14 KB (1,972 words) - 02:22, 27 June 2020
- William Paulsen. William Paulsen, Samuel Cowgill.15 KB (2,166 words) - 20:33, 16 July 2023
File:Ack4aFragment.jpg William Paulsen. Tetration is repeated exponentiation. (2016). We can define $^0b = 1, ^1b(3,457 × 1,776 (1.63 MB)) - 08:28, 1 December 2018File:Ack4bFragment.jpg William Paulsen. Tetration is repeated exponentiation. (2016). We can define $^0b = 1, ^1b(3,457 × 1,776 (1.62 MB)) - 08:28, 1 December 2018File:Ack4dFragment.jpg William Paulsen. Tetration is repeated exponentiation. (2016). We can define $^0b = 1, ^1b(3,457 × 1,776 (1.4 MB)) - 08:28, 1 December 2018- William Paulsen. William Paulsen and Samuel Cowgill. Solving \(F(z+1)=b^{F(z)}\) in the complex plane. Advan6 KB (950 words) - 18:48, 30 July 2019
- William Paulsen. Finding the natural solution to f(f(x))=exp(x). Korean J. Math. 24 (2016), William Paulsen and Samuel Cowgill. Solving \(F(z\!+\!1)=b^F(z)\) in the complex plane. Adv15 KB (2,392 words) - 11:05, 20 July 2020
- http://journal.kkms.org/index.php/kjm/article/view/428 William Paulsen. Finding the natural solution to f(f(x))=exp(x). Korean J. Math. Vol 24, No https://link.springer.com/article/10.1007/s10444-017-9524-1 William Paulsen, Samuel Cowgill. Solving F(z + 1) = b ^ F(z) in the complex plane. Advances12 KB (1,732 words) - 14:01, 12 August 2020
File:Knesermap.jpg http://journal.kkms.org/index.php/kjm/article/view/428 William Paulsen. Finding the natural solution to f(f(x))=exp(x). Korean J. Math. Vol 24, No https://link.springer.com/article/10.1007/s10444-017-9524-1 William Paulsen, Samuel Cowgill. Solving F(z + 1) = b ^ F(z) in the complex plane. Advances(2,352 × 2,316 (1.55 MB)) - 06:42, 1 January 2020File:Kneserplot.png http://journal.kkms.org/index.php/kjm/article/view/428 William Paulsen. Finding the natural solution to f(f(x))=exp(x). Korean J. Math. Vol 24, No https://link.springer.com/article/10.1007/s10444-017-9524-1 William Paulsen, Samuel Cowgill. Solving F(z + 1) = b ^ F(z) in the complex plane. Advances(1,798 × 1,347 (185 KB)) - 07:43, 1 January 2020- [[Shell-Thron region]] in [[complex plane]] <ref name="paulsen"> [[William Harold Paulsen]]. Tetration for complex bases.7 KB (1,082 words) - 07:03, 13 July 2020
File:ShellThronRegionPaulsen2.png Figure 1 from publication by [[William Harold Paulsen]], 2019 [[William Harold Paulsen]]. Tetration for complex bases.(569 × 580 (16 KB)) - 06:51, 13 July 2020File:William Paulsen.jpg [[William Harold Paulsen]], 2020. William Harold Paulsen(128 × 128 (5 KB)) - 06:52, 13 July 2020File:Tet2uMap.jpg ...bitrary base, the coefficients of the expansion are calculated by [[Wiliam Paulsen]] and [[Samuel Cowgill]] <ref> William Paulsen, Samuel Cowgill.(1,729 × 1,120 (526 KB)) - 07:21, 24 July 2020- is described by [[William Paulsen]] and [[Samuel Cowgill]] for various base \(b\) (not only for \(b\!=\!2\) William Paulsen & Samuel Cowgill.6 KB (845 words) - 17:10, 23 August 2020
- http://link.springer.com/article/10.1007/s10444-017-9524-1 [[William Paulsen]] and [[Samuel Cowgill]]. Solving F(z+1)=bF(z) in the complex plane. Advanc4 KB (548 words) - 14:27, 12 August 2020