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- [[File:Logi1a345T300.png|600px|thumb|<small> Various iterates of \(T^c=\mathrm{LogisticOperator}_s\) for : \(\!\!\!\!\!\!\!\!\!\!\!(2) ~ ~ ~ ~ F(z\!+\!1)=T(F(z))\)6 KB (817 words) - 19:54, 5 August 2020
- ...T.png|400px|thumb|Iterates of the Keller function: \(y\!=\!\mathrm{Keller}^t(x)\)]] Using [[Shoka function|Shoka]] and [[ArcShoka]], the \(t\)th iterate of the [[Keller function]] can be expressed as follows:10 KB (1,479 words) - 05:27, 16 December 2019
- ...!2 n)\mathrm i + t\) for integer values of \(n\) and positive values of \(t\). :\( \!\!\!\!\!\!\!\!\!\! (5) ~ ~ ~ T(z)=\mathrm {Keller}(z)=\ln\Big(1+\mathrm e \,(\mathrm e^z-1)\Big)\)10 KB (1,507 words) - 18:25, 30 July 2019
- ...comparison of various [[superfunction]]s \(F\) of the transfer functions \(T\) of realistic physical systems, the extension to the complex plane seems t :\( T(F(z))=F(z\!+\!1)\)3 KB (441 words) - 18:26, 30 July 2019
- in general, the \(t\)th iteration of the Keller function can be written as follows: ...e ~ ~ ~ \mathrm{Keller}^t(z)= z+t+\ln\!\Big(1-\mathrm e^{-z}(1-\mathrm e^{-t}) \Big)\)4 KB (545 words) - 18:26, 30 July 2019
- z_type lofp1(z_type z){DB x=Re(z),y=Im(z), t=x*x+y*y; if(t<2.) return lofp0(z);3 KB (353 words) - 15:01, 20 June 2013
- z_type t=(log(z)-F0)/c2; z_type v=sqrt(t); z_type u=v*(1.+v*(p+A*t))995 bytes (148 words) - 18:46, 3 September 2023
- ...e above gives the expansion of superfunction \(f\) for the base function \(T\!=\!\mathrm{zex}\) in the following form:7 KB (1,076 words) - 18:25, 30 July 2019
- ...correspondant à ce nombre dans le Système international d'unités est T (téra).9 KB (919 words) - 19:47, 6 January 2020
- ...yle (\hbar \omega)/(kT)\), а не как \(\displaystyle (\hbar \omega/k)*T\).8 KB (210 words) - 18:33, 30 July 2019
- ...e TaniaS(z_type z){int n; z_type s,t=z+z_type(2.,-M_PI);t*=2./9.; t=I*sqrt(t); s=-1.+t*(3.+t*(-3.+t*(.75+t*(.3+t*(.9/16.+t*(-.3/7.+t*(-12.51/224. //+t*(-.9/28.)1 KB (209 words) - 15:01, 20 June 2013
- ...ystyle +\frac{226287557 t^9}{37623398400}\) \(\displaystyle -\frac{5776369 t^{10}}{1515591000} +..\)3 KB (223 words) - 18:48, 30 July 2019
- [[SuZex]] is [[superfuncton]] for the [[transfer function]] \(T=\,\,\)[[zex]]; (1) \(~ ~ ~ T(z)=\mathrm{zex}(z) = z\,\exp(z)~\)14 KB (2,037 words) - 18:25, 30 July 2019
- // which is [[superfunction]] for the [[transfer function]] T(z)=[[zex]](z)= z exp(z) <br>12 KB (682 words) - 07:06, 1 December 2018
- z_type LambertWe(z_type z){ int n,m=100; z_type t=1./M_E+z; t*=2*M_E; t=sqrt(t); z_type s=LambertWeCoe[m]*t; for(n=m-1; n>0; n--) { s+=LambertWeCoe[n]; s*=t;} return -1.+s;}5 KB (287 words) - 15:01, 20 June 2013
- [[AuZex]] is [[Abel function]] for the [[transfer function]] \(T\!=\,\)[[zex]], which has the only one real [[fixed point]] \(L\!=\!0\). Aim ...an be implemented for any reasonable holomorphic transfer function. Case \(T=\mathrm{zex}\) is important example of the transfer [[function]], for which6 KB (899 words) - 18:44, 30 July 2019
- Steven T. Corneliussen.5 KB (833 words) - 07:03, 1 December 2018
- ...often it is assumed that \(a\) is real. The real-real plot of function \(T(z)\!=\!z^a\) is shown in Fig.1 for several values of \(a\). \(T(z)= \mathrm{Pow}_{c,r}(z)= c \, z^{1+r}\)15 KB (2,495 words) - 18:43, 30 July 2019
- </ref>, because it begins with letter \(T\), often used to denote the [[Transfer function]]. The question, wether to ...modification is described in this section. Let the [[Transfer function]] \(T\) be defined with9 KB (1,320 words) - 11:38, 20 July 2020
- \( \!\!\!(1) ~ ~ ~ T(f(z))=f(kz)\)<br> \(\!\!\! (9) ~ ~ ~ \displaystyle x=\frac{h\cdot (T-T_0)}{k T T_0}\)3 KB (47 words) - 18:36, 30 July 2019
