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It looks similar to \(\Gamma\) or \(\mathbb\gamma\).

\mathrm{Chi}_k(x)=\frac{x^{k/2-1}\ \exp(-x/2)}{2^{k/2}\ \Gamma(k/2)} \Gamma \left( \frac{N-1}{2} \right)

'''BesselY0''', called also [[Neumann function]], and also \(\mathrm{BesselY}_0\) or simply \(Y_0\) is kind of [[Bessel function]]

...s an approximate value for the factorial function n! or the gamma function Gamma(n) for n>>1. .. </ref>) refers to the set of [[asymptotic]]s of [[Factorial]] and/or [[Gamma function]]

\(\Psi\) is wave function, the dot differentiats it with respect to time, ...articles, [[environment]], giving evolution of the component of the [[wave function]] of the particle that "did not yet interact" with the environment.

'''Bessel function''' referes to a solution \(f\) of the [[Bessel equation]] : \(\displaystyle J_\nu(x)=\frac{2 (x/2)^{-\nu}}{\pi^{1/2} \Gamma(1/2-\nu)}

for implementation of [[special function]]s. <th>Function f(z)</th>

\(\Psi\) is wave function, the dot differentiats it with respect to time, ...articles, [[environment]], giving evolution of the component of the [[wave function]] that "did not yet interact" with the environment.

...ibution]] is term from scientific [[slang]]; it may refer to hololomorphic function of two variables \frac{\Gamma\left(\frac{\nu+1}{ 2 }\right)}{\sqrt{\pi\ \nu}\ \Gamma\left(\frac{\nu}{2}\right)} \left(1 + \frac{~ t^2}{\nu }\right)^{-(\nu+1)/2}

[[Koenigs function]] ([[Функция Кёнигса]] <ref> V.V.Goryainov. [[Koenigs function]] and [[fractional iterate]]s of probability generating functions.

Here, the upper index of a function indicates the number of [[iteration]]s. Superfactorial can be expressed through the [[Mathematica]] built-in function [[Nest]],

[[Amos]] (or [[amos]]) is special function, defined through function [[Lof]]: Explicit plot of function [[Amos]] of real argument is shown in figure at right wtth black curve.

...along the real axis; for non-negative integer values of the argument, this function has integer values. <ref name="IRENE"> M.Abramowitz and I.Stegun: Handbook of Mathematical Functions. 6. Gamma Function and Related Functions (2010)

[[Asymptotic]] \(A\) of function \(f\) at point \(z_0\) on the domain \(D\in\mathbb C\) while the input of function, remaining within domain \(D\) approaches \(z_0\).

...tion]]; independent of [[numerical error]] (e.g. \(\pi\), \(\sqrt{2}\), \(\Gamma(z)\) )</td><td>has definitions that allows the [[evaluation]] with any requ ...this quantity or similar quantities. Mathematical constants and [[special function]]s are exact.

This function is shown in figure below with red curve. ...\(N\) observations refers to function \(\mathrm{Student}_{N-1}\). For this function, the spread is