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- </ref> in collaboration with [[Henryk Trappmann]] from the [[Berlin University]], Germany. Then, since 2011 the s [[Heils Henryk Abel]] and [[Ernst Schröder]] (even in his time, those works were pretty13 KB (1,766 words) - 18:43, 30 July 2019
- The [[Abel function]] and the [[Abel Equation]] are named after [[Neils Henryk Abel]] ...ouznetsov, H.Trappmann. Portrait of the four regular super-exponentials to base sqrt(2). Mathematics of Computation, 2010, v.79, p.1727-1754 KB (547 words) - 23:16, 24 August 2020
- D.Kouznetsov, H.Trappmann. Portrait of the four regular super-exponentials to base sqrt(2). Mathematics of Computation, 2010, v.79, p.1727-1756. ...ppmann, D.Kouznetsov. Computation of the Two Regular Super-Exponentials to base exp(1/e). (Mathematics of Computation, 2012 February 8.) ISSN 1088-6842(e)14 KB (2,203 words) - 06:36, 20 July 2020
- ...ouznetsov, H.Trappmann. Portrait of the four regular super-exponentials to base sqrt(2). Mathematics of Computation, 2010, v.79, p.1727-1756.7 KB (381 words) - 18:38, 30 July 2019
- Consider [[logarithm]] to base \(~s~\) from both sides of equation (1), assuming that \(~s~\) and \(~g(z)~ </ref>, [[Henryk Trappmann]] suggests for such an iterate name [[regular iteration]] or [[re8 KB (1,239 words) - 11:32, 20 July 2020
- [[File:Ack3a600.jpg|400px|thumb|Base \(b=\sqrt{2}\approx 1.41\)]] [[File:Ack3b600.jpg|400px|thumb|Henryk base, \(b=\exp(1/\mathrm e)\approx 1.44\)]]5 KB (761 words) - 12:00, 21 July 2020
File:E1e14z600.jpg ...ppmann, D.Kouznetsov. Computation of the Two Regular Super-Exponentials to base exp(1/e). Mathematics of computation, 2012 February 8. ISSN 1088-6842(e) IS [[Category:Henryk base]](3,566 × 6,300 (1.85 MB)) - 08:34, 1 December 2018
File:E1eAuMap600.jpg [[Complex map]]s of the [[abel function]] of the [[exponent]] to the [[Henryk base]] \newcommand \rme {{\rm e}} %%makes the base of natural logarithms Roman font(3,543 × 5,338 (1.57 MB)) - 08:34, 1 December 2018
File:E1eiterT.jpg [[Iterate]] of exponential to the [[Henryk base]] $\eta=\exp(1/\mathrm e)$; ...ppmann, D.Kouznetsov. Computation of the Two Regular Super-Exponentials to base exp(1/e). Mathematics of Computation. Math. Comp., v.81 (2012), p. 2207-222(2,166 × 2,179 (1.03 MB)) - 08:34, 1 December 2018
File:E1esuma8.jpg [[Complex map]] of the growing [[superfunction]] of exponential to [[base e1e]] where $\eta=\exp(1/\mathrm e)$ is the [[Henryk base]]; and $F=\mathrm{SuExp}_{\eta,3}$ is real–holomorphic solution of the [[(4,472 × 3,320 (1.76 MB)) - 08:34, 1 December 2018
File:E1eSuMap600.jpg [[Complex map]]s of two superexponentials to the [[Henryk base]] \newcommand \rme {{\rm e}} %%makes the base of natural logarithms Roman font(3,377 × 5,055 (1.37 MB)) - 08:34, 1 December 2018
File:Expe1eplotT.jpg [[Explicit plot]] of [[exponential]] to [[base e1e]] (thick green curve) and that of the [[exponential]] to [[base sqrt2]] (thin red curve)(2,515 × 1,751 (350 KB)) - 08:35, 1 December 2018
File:Sqrt2sufuplot.png Four superexponentials to base \(b=\sqrt{2}\) This image is used also in article with Henryk Trappmann(3,520 × 2,507 (408 KB)) - 10:11, 10 June 2022
File:Tet5loplot.jpg $\mathrm e\!=\!\exp(1)\!\approx\!2.71$ is base of the natural logarithm, $\tau\!\approx\! 1.63532$ is crytical base; at $b\!=\!\tau$, tetration has 2 real fixed points:(1,477 × 1,486 (283 KB)) - 08:53, 1 December 2018- [[Base e1e]] refers to the value of base \(b= \eta =\exp(1/\mathrm e)\approx 1.4446678610\) In future, this may refer also to the highest [[Ackermann function]]s to this base.4 KB (559 words) - 17:10, 10 August 2020
- [[File:ExpQ2mapT.png|300px|thumb|[[Complex map|Map]] of [[exponent]] to base \(b=\sqrt{2}\); lines of constant \(u\) and lines of constant \(v\) show [[File:Logq2mapT1000.jpg|300px|thumb|[[Complex map|Map]] of [[Logarithm]] to base \(b=\sqrt{2}\); lines of constant \(u\) and lines of constant \(v\) show3 KB (557 words) - 18:46, 30 July 2019
- ...valuation of the growing [[superfunction]] for the exponential to [[Henryk base]], \(\eta=\exp(1/\mathrm e)\).2 KB (219 words) - 18:48, 30 July 2019
- // [[e1etf.cin]] is routine that evaluates [[tetration to Henryk base]] \(\eta=\exp(1/\mathrm e)\). [[Category:Henryk base]]2 KB (203 words) - 18:48, 30 July 2019
- [[File:Sqrt2sufuplot.png|400px]]<small><center>Four superexponentials to base \(\sqrt{2}\) It refers to the two superexponentials to base \( \sqrt{2} \); they are denoted as10 KB (1,491 words) - 18:09, 11 June 2022
