File:TetrationAsymptoticParameters01.jpg: Difference between revisions

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== Summary ==
== Summary ==
{{Image_Details
Importing file
|description  = '''Parameters of the asymptotic of tetration at base''' <math>b</math>.
Absicssa for all curves is <math>\ln(b)</math>.
The scale in the ordinate axis is 0.1 of scale at the absciss axis.
Values
<math>\ln(b)\!=\!\ln(2)/2</math>,
<math>\ln(b)\!=\!1/\rm e</math>,
<math>\ln(b)\!=\!\ln(10)\!\approx\! 2.3</math>~
are shown with additional vertical gridlines;
ordinate equal to <math>\rm e</math> is shown with additional horisontal gridline.
\vskip 2mm
 
'''Eigenvalues of logarithm'''.
Solutions of Equation
<math>L=\log_b(L)</math>
are plotted with thin lines;
At <math>\ln(b)<1/\rm e</math>, there exist two real solutions; the curve goes through points
<math>(\ln(2)/2,2)</math>,
<math>(1/\rm e,\rm e)</math>,
<math>(\ln(2)/2,4)</math> and passes close to point
<math>(0.3,6)</math>.
At <math>\ln(b)=1/\rm e</math>, the two solutions coincide.
At <math>\ln(b)>1/\rm e</math>, the two solutions differ only by the sign of the imaginary part;
the two options for the imaginary parts are shown with with thin dashed lines; and the
thin solid line indicates the real part.
At <math>\ln(b)>1.6</math>, the real part of
<math>L</math> is negative.
 
'''Asymptotic increment.'''
The thick lines shows the asymptotic increment <math>Q</math>.
At <math>\ln(b)<1/e</math>, the two possible values of increment are real; negative values indicate
that the asymptotic decays in the direction of real axis.
At <math>\ln(b)=1/e</math>, the increment is zero.
At <math>\ln(b)>1/e</math>, there are two possible values of increment, that differ by signum of its
imaginary part. The positive imaginary part is plotted with dashed line.
That with negative imaginary part is not plotted.
The real part of increment
<math>Q</math> is shown with thick solid line. At
<math>\ln(a)>1/\rm e</math>,
the real part is positive, and in the range of the figure it does not esceed unity.
 
'''Asymptotic period'''
The asymptotic period <math>T=2\pi i/Q</math> is shown with dotted lines.
At <math>\ln(b)<1/e</math> there are two possibel periods, and they have pure imaginary valies.
In order to simplify the comparison, the modulus of the period is plotted for the case of
negative decrement (lower branch of the thick curve).
 
At <math>\ln(b)=1/\rm e</math>, both asymptotic periods are infinite.
 
At <math>\ln(a)>1/\rm e</math>, there exist two mutually-conjugated solutions; the real part of the
period <math>T</math> is shown with the upper dotted curve, while the imaginary part is shown
with lower dotter curve. Again, the option with negative imahhinary part is not plotted
in order to avoid overfill the figure with curves.
|author      = Dmitrii Kouznetsov
|copyright    = Dmitrii Kouznetsov
|source      = [[TetrationAsymptoticParameters00]] (one C++ file generates the eps figure)
|date-created = 2008
|pub-country  = Japan
|notes        = Feel free to download, to execute, to distribute and modify the source as you need.
Please, indicate the source and modifications (if any) if you distribute it.
|versions    =
}}
 
==Message by Author==
The source used to plot the figure is at [[TetrationAsymptoticParameters00]]
Feel free to download it, to use it, to distribute it, to modify it, and even watch how it is done and write your own code, even better!
[[User:Dmitrii Kouznetsov|Dmitrii Kouznetsov]] 09:13, 23 May 2008 (CDT)
 
== Licensing/Copyright status ==
{{attribution}}

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