User:Dmitrii Kouznetsov/loginal

Template:Under construction; Name of article is temporal. Loginal of function ${\displaystyle g}$ at some space S is function ${\displaystyle K}$ such tat

(1) ${\displaystyle f^{a}(K(t))=K(a+t)}$ for all ${\displaystyle t\in {\rm {S}}}$

Loginal allow the solution ${\displaystyle f}$ of equation

(2) ${\displaystyle f^{n}(x)=g(x)}$

in form

(3) ${\displaystyle f(x)=K\!\left({\frac {1}{n}}+K^{-1}(x)\right)}$

Loginal should be invertable

(4) ${\displaystyle f(x)=g^{1/n}(x)=g^{1/n}{\Big (}K\!{\Big (}K^{-1}(x){\Big )}{\Big )}}$${\displaystyle =K\!\left({\frac {1}{n}}+K^{-1}(x)\right)}$

Then, at the substitution to the initial equation (1)

(5) ${\displaystyle f^{2}(x)=f(f(x))=f\!\left(K\!\left({\frac {1}{n}}+K^{-1}(x)\right)\right)}$

(6) ${\displaystyle f^{2}(x)=K\!\left({\frac {1}{n}}+K^{-1}\left(K\!\left({\frac {1}{n}}+K^{-1}(x)\right)\right)\right)}$

${\displaystyle f^{2}(x)=K\left({\frac {1}{n}}+{\frac {1}{n}}+K^{-1}(x)\right)=K\left({\frac {2}{n}}+K^{-1}(x)\right)}$

Special cases

Summation

In particular, if ${\displaystyle g}$ means addition a constant ${\displaystyle c}$, id est, ${\displaystyle g(x)=x+c}$, then

(7) ${\displaystyle nc+K(t)=K(t+n)}$

means that ${\displaystyle K(t)=t=K^{-1}(t)}$

In such a way, this case is trivial.

Multiplication

If ${\displaystyle g}$ means multiplication by a constant ${\displaystyle c}$, id est, ${\displaystyle g(x)=x*c}$, then

(8) ${\displaystyle c^{n}K(t)=K(t+n)}$

means that ${\displaystyle K(t)=c^{t}}$ and ${\displaystyle K^{-1}(t)=\log _{c}(t)}$.

Exponentiation

For exponentiation, ${\displaystyle K}$ is tetration,

(11) ${\displaystyle \exp(K(x))=K(x+1)}$;

or ${\displaystyle \exp ^{n}(K(x))=K(x+n)}$

In particular, I can extract the square root of exponential, id est, to find finction ${\displaystyle f={\sqrt {(}}\exp )=\exp ^{1/2}}$ such that

(12) ${\displaystyle f(f(x))=\exp(x)}$

The calculation is straightforward:

(13) ${\displaystyle f(x)=\exp ^{1/2}(x)=\exp ^{1/2}\left(F(F^{-1}(x))\right)=F\left({\frac {1}{2}}+F^{-1}(x)\right)}$

Checkback:

(14) ${\displaystyle f(f(x))=F\!\left({\frac {1}{2}}+F^{-1}\!\left(F\!(\left({\frac {1}{2}}+F^{-1}(x)\right)\right)\right)}$

(15) ${\displaystyle f(f(x))=F\!\left({\frac {1}{2}}+{\frac {1}{2}}+F^{-1}(x)\right)}$

(16) ${\displaystyle f(f(x))=F\!\left(1+F^{-1}(x)\right)=\exp(F(F^{-1}(x))=\exp(x)}$

In general case, finding of loginal ${\displaystyle K}$ of a heneral function ${\displaystyle g}$ is not trivial.

References

(needs to be cleaned up)

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