Difference between revisions of "Linear fuction"

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m (Text replacement - "\$([^\$]+)\$" to "\\(\1\\)")
 
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[[File:Itelin125T.jpg|440px|thumb|Iterates of \(T(z)=A+Bz~\) at \(~A\!=\!1\), \(B\!=\!2~\); \(~y=T^n(x)~\) versus \(x\) for various \(n\)]]
 
[[Linear function]] is function that can be represented in form
 
[[Linear function]] is function that can be represented in form
   
$(1) ~ ~ ~ T(z)=A+B z$
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\((1) ~ ~ ~ T(z)=A+B z\)
   
where $A$ and $B$ are constants.
+
where \(A\) and \(B\) are constants (for example some complex numbers)
   
 
==Abelfunction and Superfunction==
 
==Abelfunction and Superfunction==
   
[[Superfunction]] $F$ for the linear function $T$ by (1) can be written as follows:
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[[Superfunction]] \(F\) for the linear function \(T\) by (1) can be written as follows:
   
$(2) ~ ~ ~ \displaystyle F(z)= A \frac{1-B^z}{1-B}$
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\((2) ~ ~ ~ \displaystyle F(z)= A \frac{1-B^z}{1-B}\)
   
 
The corresponding [[Abel function]] can be expressed as follows:
 
The corresponding [[Abel function]] can be expressed as follows:
   
$(3) ~ ~ ~ \displaystyle G(z)= \log_B\Big(1+\frac{B-1}{A}z \big)$
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\((3) ~ ~ ~ \displaystyle G(z)= \log_B\Big(1+\frac{B-1}{A}z \big)\)
   
 
==Iterates==
 
==Iterates==
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the superfunction and the Abel function in the standard way,
 
the superfunction and the Abel function in the standard way,
   
$(4) ~ ~ ~ \displaystyle T^n(z)=F(n+G(z))$
+
\((4) ~ ~ ~ \displaystyle T^n(z)=F(n+G(z))\)
   
Substitution of the Superfunction $F$ by (2) and the Abel function $G$ by (3) into equation (4) gives aslo linear function
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Substitution of the Superfunction \(F\) by (2) and the Abel function \(G\) by (3) into equation (4) gives aslo linear function
   
$(5) ~ ~ ~ \displaystyle T^n(z)=
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\((5) ~ ~ ~ \displaystyle T^n(z)=
\frac{-A+B^n\Big( A+(-1+B) z\Big)}{-1+B}$
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\frac{-A+B^n\Big( A+(-1+B) z\Big)}{-1+B}=A \frac {B^n-1}{B-1} +B^n z\)
   
with new parameters $A \frac {B^n-1}{B-1}$ instead of $A$ in (1) and
+
with new parameters \(A \frac {B^n-1}{B-1}\) instead of \(A\) in (1) and
  +
\(B^n\) instead of \(B\). With this representation, the number \(n\) of iteration has no need to be integer. As other holomophic functions, the linear function can be iterated even complex number of times.
$B^n$ instead of $B$.
 
   
 
==References==
 
==References==
 
<references/>
 
<references/>
 
   
 
==Keywords==
 
==Keywords==
[[Abel function]]
+
[[Abel function]],
 
[[Holomorphic function]],
 
[[Holomorphic function]],
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[[Iteration]],
[[Iterate of function]]
 
 
[[Superfunction]]
 
[[Superfunction]]
   

Latest revision as of 18:43, 30 July 2019

Iterates of \(T(z)=A+Bz~\) at \(~A\!=\!1\), \(B\!=\!2~\); \(~y=T^n(x)~\) versus \(x\) for various \(n\)

Linear function is function that can be represented in form

\((1) ~ ~ ~ T(z)=A+B z\)

where \(A\) and \(B\) are constants (for example some complex numbers)

Abelfunction and Superfunction

Superfunction \(F\) for the linear function \(T\) by (1) can be written as follows:

\((2) ~ ~ ~ \displaystyle F(z)= A \frac{1-B^z}{1-B}\)

The corresponding Abel function can be expressed as follows:

\((3) ~ ~ ~ \displaystyle G(z)= \log_B\Big(1+\frac{B-1}{A}z \big)\)

Iterates

Iterate of the linear function can be expressed through the superfunction and the Abel function in the standard way,

\((4) ~ ~ ~ \displaystyle T^n(z)=F(n+G(z))\)

Substitution of the Superfunction \(F\) by (2) and the Abel function \(G\) by (3) into equation (4) gives aslo linear function

\((5) ~ ~ ~ \displaystyle T^n(z)= \frac{-A+B^n\Big( A+(-1+B) z\Big)}{-1+B}=A \frac {B^n-1}{B-1} +B^n z\)

with new parameters \(A \frac {B^n-1}{B-1}\) instead of \(A\) in (1) and \(B^n\) instead of \(B\). With this representation, the number \(n\) of iteration has no need to be integer. As other holomophic functions, the linear function can be iterated even complex number of times.

References


Keywords

Abel function, Holomorphic function, Iteration, Superfunction