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- [[File:Superpower2plot.jpg|360px|thumb|Fig.1. Quadratic function (black curve) and two its [[superfunction]]s]] ...ific [[superpower]] function, id est, the [[superfunction]] of the [[power function]] \(~z\mapsto z^a\!=\!\exp(\ln(z) \,a)~\)1 KB (202 words) - 18:48, 30 July 2019
- [[File:Superpower2plot.jpg|360px|thumb|Fig.1. Quadratic function (black curve) and two its superfunctions]] ...ific [[superpower]] function, id est, the [[superfunction]] of the [[power function]] \(~z\mapsto z^a\!=\!\exp(\ln(z) \,a)~\)3 KB (405 words) - 18:43, 30 July 2019
- [[Legendre function]] is solution \(F\) of equation For \(\ell\!=\!1\), the solution is linear function.3 KB (442 words) - 18:44, 30 July 2019
- [[Mandelbrot polynomial]] is special kind of quadratic polynomial, written in form [[Superfunction]] \(\Phi\) for the transfer function \(P_c\) can be constructed from the [[Superfunction]] \(F\) of the [[Logist2 KB (229 words) - 18:44, 30 July 2019
- [[File:Superpower2plot.jpg|300px|thumb|Fig.1. Quadratic function (black curve) and two its superfunctions]] [[Superpower]] or '''superpower function''' is [[superfunction]] for [[power function]] \(T(z)=z^a\) where \(a\) is parameter; often it is assumed, that \(a\!>\!6 KB (903 words) - 18:44, 30 July 2019
- </ref>, which is quadratic function \(T\) of special kind: ...uperfunction]]s \(F\) for the [[Logistic operator]], id est, [[holomorphic function|holomorphic]] solution \(F\) of equation3 KB (411 words) - 18:26, 30 July 2019
- [[Logistic operator]] (or '''LogisticOperator''') is quadratic function of specific kind determined with the single parameter \(s\), which is usula ...(u\) or \(q\)). In such a way, \(\mathrm{LogisticOperator}_s\) is [[entire function]].6 KB (817 words) - 19:54, 5 August 2020
- [[Power function]] ([[Степенная функция]]) is one of the primary [[elementary function]]s; ...parameter; 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 \(a\).15 KB (2,495 words) - 18:43, 30 July 2019
- ...] appears at the solution of the [[Stationary Schroedinger equation]] with quadratic potential. == [[Oscillator function]]s ==4 KB (628 words) - 18:47, 30 July 2019
- ...of the special case of quadratic [[transfer function]] called [[Logistic]] function or [[LogisticOperator]] ...Sequence are shown in two figures at right. Below, the [[complex map]]s of function \(\mathrm{LogisticSequence}_s\) are shown for \(s\!=\!3\) and for \(s\!=\!47 KB (886 words) - 18:26, 30 July 2019
- Function [[maga]] appears at the consideration of the principal mode guided by the s The scalar product of function [[mori]] to itself with quadratic defacement is denoted with identifier [[naga]]8 KB (1,256 words) - 18:44, 30 July 2019
- ...([[итерация]]) is function, expressed as repetition of another (iterated) function, that may be called [[iterand]]. Any function by itself is considered as its first iteration.15 KB (2,245 words) - 16:43, 15 February 2026
- ...rate_of_linear_fraction]] (or [[iteration of linnet friaction]]) refers to function First, consider the special case when the iterated function has only single parameter. Let13 KB (2,088 words) - 06:43, 20 July 2020
- ...] is a special kind of polynomial, suggested as an example of a [[transfer function]] in the book «[[Superfunctions]]» <ref name="book"> Dmitrii Kouznetsov. ''Nemtsov function and its iterates''. [[Mizugadro Preprint]], 2016.17 KB (2,448 words) - 13:27, 7 December 2025
- ...] or [[regular iterate]] refer to the [[fractional iterate]] a holomorphic function that is holomorphic in vicinity it its fixed point A [[fractional iterate]] \(\phi\) of an analytic function \(f\) at fixpoint \(a\) is called regular, iff \(\phi\) is analytic at \(a\22 KB (3,208 words) - 04:04, 7 February 2026
- For some holomorphic function \(T\) (called «[[Transfer function]]»), the [[Superfunction]] \(F\) For a given transfer function \(T\) and its superfunction \(F\),13 KB (1,553 words) - 15:10, 18 August 2025
- * continued administrative function * growth slower than quadratic39 KB (4,459 words) - 00:38, 27 March 2026
- quadratic function of time \(d\) measured in days since the beginning of year 2022.17 KB (952 words) - 17:38, 6 October 2025
- * continued administrative function as quadratic function of time \(d\) measured in days since 2022.01.01.<br>35 KB (3,975 words) - 01:44, 27 March 2026
- ...itarized and denazified]] at the [[Dvizhuha]] is extrapolated as quadratic function of time \(d\) ("days") measured in days since the beginning of year 2022. T ...Russian [[cannon fodder]] grows approximately linearly. This leads to the quadratic growth of the cumulative loss.32 KB (3,172 words) - 01:16, 23 February 2026