Difference between revisions of "File:Sqrt2tetatemap.jpg"
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| + | {{oq|Sqrt2tetatemap.jpg|Original file (1,758 × 1,741 pixels, file size: 1,008 KB, MIME type: image/jpeg)}} |
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| ⚫ | |||
| + | Fig.16.4 from page 224 of book «[[Superfunctions]]» <ref> |
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| ⚫ | |||
| ⚫ | |||
| ⚫ | |||
| ⚫ | |||
| + | |||
| + | This image appears also as Рис.16.4 at page 229 of the Russian version «[[Суперфункции]]» |
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| ⚫ | |||
| ⚫ | |||
| + | Дмитрий Кузнецов. [[Суперфункции]]. [[Lambert Academic Publishing]], 2020. |
||
| + | </ref>, 2020. |
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| + | |||
| ⚫ | |||
| + | <ref> |
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| ⚫ | |||
| + | http://mizugadro.mydns.jp/PAPERS/2010sqrt2.pdf offprint |
||
| ⚫ | |||
| + | </ref> at [[Mathematics of Computation]], 2010 (top right map) |
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| + | |||
| ⚫ | |||
| + | |||
| ⚫ | |||
for the [[tetration]] |
for the [[tetration]] |
||
| − | and [[arctetration]] to base |
+ | and [[arctetration]] to base \(\sqrt{2}\) |
| − | in the plane |
+ | in the plane \(x=\Re(z)\), \(y=\Im(z)\) |
is shaded with lines |
is shaded with lines |
||
| − | + | \(u=\Re \Big( \mathrm{tet}_{\sqrt{2}}(\mathrm{ate}_{\sqrt{2}}(z)) \Big) = \mathrm{const}\) |
|
and lines |
and lines |
||
| − | + | \(v=\Im \Big( \mathrm{tet}_{\sqrt{2}}(\mathrm{ate}_{\sqrt{2}}(z)) \Big) = \mathrm{const}\) |
|
These lines provide the shading of the central part of the picture. |
These lines provide the shading of the central part of the picture. |
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| Line 18: | Line 38: | ||
In addition, lines |
In addition, lines |
||
| − | + | \(\Im\Big( \exp_{\sqrt{2}}^n (x\!+\!\mathrm i y)\Big)=\pm \frac{|P|}{2}=\pm \frac{2\, \pi}{\ln(2)}\) |
|
| − | $ |
||
| − | are drawn for |
+ | are drawn for \(n=0,1,2,3,4\) as bounds if the shaded range. Here \(P=4 \pi \mathrm i / \ln(2)\) is period of |
| + | [[Tetration]] to base \(\sqrt{2}\). |
||
| − | |||
| − | Usage: this is figure 16.5 of the book [[Суперфункции]] (2014, In Russian) <ref> |
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| − | https://www.morebooks.de/store/ru/book/Суперфункции/isbn/978-3-659-56202-0 <br> |
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| − | http://www.ils.uec.ac.jp/~dima/BOOK/202.pdf <br> |
||
| ⚫ | |||
| ⚫ | |||
| − | </ref>; the English version is in preparation in 2015. (Numeration of figures in the English version may be different from that of the Russian version.) |
||
| − | |||
| ⚫ | |||
| − | The algorithm of the evaluation is also described in the article |
||
| ⚫ | |||
| ⚫ | |||
| ⚫ | |||
| ⚫ | |||
| ⚫ | |||
| − | (top right map) |
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| − | |||
| ⚫ | |||
| − | <references/> |
||
==[[C++]] generator of the shading== |
==[[C++]] generator of the shading== |
||
| − | Files [[ado.cin]], |
+ | /* Files [[ado.cin]], |
[[conto.cin]], |
[[conto.cin]], |
||
[[sqrt2f21e.cin]] |
[[sqrt2f21e.cin]] |
||
[[sqrt2f21l.cin]] |
[[sqrt2f21l.cin]] |
||
| − | should be loaded in order to compile the code below. |
+ | should be loaded in order to compile the code below.*/ |
| + | <pre> |
||
| − | |||
| − | <poem><nomathjax><nowiki> |
||
#include <math.h> |
#include <math.h> |
||
#include <stdio.h> |
#include <stdio.h> |
||
| Line 123: | Line 123: | ||
// getchar(); system("killall Preview"); // For macintosh |
// getchar(); system("killall Preview"); // For macintosh |
||
} |
} |
||
| + | </pre> |
||
| − | </nowiki></nomathjax></poem> |
||
==[[C++]] generator boundaries of the shading== |
==[[C++]] generator boundaries of the shading== |
||
| + | /* |
||
Files [[ado.cin]], |
Files [[ado.cin]], |
||
[[conto.cin]], |
[[conto.cin]], |
||
[[sqrt2f21e.cin]] |
[[sqrt2f21e.cin]] |
||
| − | should be loaded in order to compile the code below. |
+ | should be loaded in order to compile the code below.*/ |
| + | <pre> |
||
| − | |||
| − | <poem><nomathjax><nowiki> |
||
| − | |||
#include <math.h> |
#include <math.h> |
||
#include <stdio.h> |
#include <stdio.h> |
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| Line 332: | Line 331: | ||
\end{picture}} |
\end{picture}} |
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\end{document} |
\end{document} |
||
| + | </pre> |
||
| − | </nowiki></nomathjax></poem> |
||
| ⚫ | |||
| + | {{ref}} |
||
| + | {{fer}} |
||
| + | ==Keywords== |
||
| ⚫ | |||
| + | «[[]]», |
||
| + | «[[]]», |
||
| + | «[[]]», |
||
| + | |||
| + | «[[Agreement]]», |
||
| ⚫ | |||
| + | «[[Base sqrt2]]», |
||
| + | «[[Book]]», |
||
| + | «[[BookMap]]», |
||
| + | «[[C++]]», |
||
| + | «[[Complex map]]», |
||
| + | «[[Identity function]]», |
||
| ⚫ | |||
| + | «[[Latex]]», |
||
| + | «[[Mathematics of Computation]]», |
||
| + | «[[Superfunction]]», |
||
| + | «[[Superfunctions]]», |
||
| ⚫ | |||
| + | |||
| + | «[[Тетрация]]», |
||
| + | |||
| + | [[Category:Abel function]] |
||
| + | [[Category:Abelfunction]] |
||
[[Category:Agreement]] |
[[Category:Agreement]] |
||
| + | [[Category:Arctetration]] |
||
[[Category:Base sqrt2]] |
[[Category:Base sqrt2]] |
||
[[Category:Book]] |
[[Category:Book]] |
||
[[Category:BookMap]] |
[[Category:BookMap]] |
||
| ⚫ | |||
| ⚫ | |||
| ⚫ | |||
[[Category:C++]] |
[[Category:C++]] |
||
| ⚫ | |||
| + | [[Category:Identity function]] |
||
| + | [[Category:Inverse function]] |
||
[[Category:Latex]] |
[[Category:Latex]] |
||
| + | [[Category:Mathematics of Computation]] |
||
| + | [[Category:Superfunction]] |
||
| + | [[Category:Superfunctions]] |
||
| + | [[Category:Test]] |
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| + | [[Category:Tetration]] |
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Revision as of 09:15, 24 December 2025
Fig.16.4 from page 224 of book «Superfunctions» [1], 2020.
This image appears also as Рис.16.4 at page 229 of the Russian version «Суперфункции» [2], 2020.
This image is used also in figure 2 of article [3] at Mathematics of Computation, 2010 (top right map)
The image shows the range of validity of relation
\(\mathrm{tet}_{\sqrt{2}}(\mathrm{ate}_{\sqrt{2}}(z))=z\)
for the tetration and arctetration to base \(\sqrt{2}\) in the plane \(x=\Re(z)\), \(y=\Im(z)\) is shaded with lines
\(u=\Re \Big( \mathrm{tet}_{\sqrt{2}}(\mathrm{ate}_{\sqrt{2}}(z)) \Big) = \mathrm{const}\)
and lines
\(v=\Im \Big( \mathrm{tet}_{\sqrt{2}}(\mathrm{ate}_{\sqrt{2}}(z)) \Big) = \mathrm{const}\)
These lines provide the shading of the central part of the picture.
In addition, lines
\(\Im\Big( \exp_{\sqrt{2}}^n (x\!+\!\mathrm i y)\Big)=\pm \frac{|P|}{2}=\pm \frac{2\, \pi}{\ln(2)}\)
are drawn for \(n=0,1,2,3,4\) as bounds if the shaded range. Here \(P=4 \pi \mathrm i / \ln(2)\) is period of Tetration to base \(\sqrt{2}\).
C++ generator of the shading
/* Files ado.cin, conto.cin, sqrt2f21e.cin sqrt2f21l.cin should be loaded in order to compile the code below.*/
#include <math.h>
#include <stdio.h>
#include <stdlib.h>
#define DB double
#define DO(x,y) for(x=0;x<y;x++)
#include <complex>
typedef std::complex<double> z_type;
#define Re(x) x.real()
#define Im(x) x.imag()
#define I z_type(0.,1.)
#include "conto.cin"
// #include "tq2e.cin"
// #include "tq2L.cin"
#include "sqrt2f21e.cin"
#include "sqrt2f21l.cin"
int main(){ int j,k,m,n; DB x,y, p,q, t; z_type z,c,d, cu,cd;
int M=401,M1=M+1;
int N=501,N1=N+1;
DB X[M1],Y[N1], g[M1*N1],f[M1*N1], w[M1*N1]; // w is working array.
char v[M1*N1]; // v is working array
FILE *o;o=fopen("sqrt2tetatema.eps","w"); ado(o,0,0,214,212);
fprintf(o,"112 110 translate\n 10 10 scale\n");
// DB sy=10.1/sinh(N/2./100.);
DO(m,M1) X[m]=-10+.05*(m-.5);
DO(n,N1) Y[n]=-10+.04*(n-.5);
// DO(n,N1) Y[n]=sy*sinh((n-N/2.+.5)/100.);
for(m=-10;m<11;m++) {M(m,-10)L(m,10)}
for(n=-10;n<11;n++) {M( -10,n)L(10,n)} fprintf(o,".006 W 0 0 0 RGB S\n");
DO(m,M1)DO(n,N1){ g[m*N1+n]=9999;
f[m*N1+n]=9999;}
DO(m,M1){x=X[m];
DO(n,N1){y=Y[n]; z=z_type(x,y);
// if( abs(z-2.)>.2 || abs(z-4.)>.2)
{ c=F21L(z);
c=F21E(c);
if(abs(c-z)<.1) {
p=Re(c); q=Im(c);
if(p>-99 && p<99) g[m*N1+n]=p;
if(q>-99 && q<99 && fabs(q)>1.e-18) f[m*N1+n]=q;
}
}}}
fprintf(o,"1 setlinejoin 2 setlinecap\n");
//p=2; q=1.1;
p=.1;q=.1;
for(m=-10;m<10;m++) for(n=2;n<10;n+=2)conto(o,f,w,v,X,Y,M,N,(m+.1*n),-q, q);
fprintf(o,".01 W 0 .6 0 RGB S\n");
for(m=0;m<10;m++) for(n=2;n<10;n+=2)conto(o,g,w,v,X,Y,M,N,-(m+.1*n),-q, q);
fprintf(o,".01 W .9 0 0 RGB S\n");
for(m=0;m<10;m++) for(n=2;n<10;n+=2)conto(o,g,w,v,X,Y,M,N, (m+.1*n),-q, q);
fprintf(o,".01 W 0 0 .9 RGB S\n");
for(m=1;m<11;m++) conto(o,f,w,v,X,Y,M,N, (0.-m),-p,p);fprintf(o,".06 W .9 0 0 RGB S\n");
for(m=1;m<11;m++) conto(o,f,w,v,X,Y,M,N, (0.+m),-p,p);fprintf(o,".06 W 0 0 .9 RGB S\n");
conto(o,f,w,v,X,Y,M,N, (0. ),-p,p);fprintf(o,".06 W .6 0 .6 RGB S\n");
for(m=-10;m<11;m++)conto(o,g,w,v,X,Y,M,N,(0.+m),-p,p);fprintf(o,".06 W 0 0 0 RGB S\n");
//#include "plofu.cin"
// M(-13.2,0)L(2,0) fprintf(o,".05 W 0 .8 0 RGB S\n");
fprintf(o,"0 setlinejoin 0 setlinecap\n");
M(2,0)L(10.1,0)fprintf(o,".05 W 1 1 1 RGB S\n");
DO(n,27){M(2+.3*n,0)L(2+.3*(n+.5) ,0)} fprintf(o,".1 W 0 0 0 RGB S\n");
//M(2,0)L(10.1,0)fprintf(o,".1 W 0 0 0 RGB [.19 .19] 0 setdash S\n");
//M(-10,0)L(-2,0)fprintf(o,".04 W 1 0 1 RGB S\n"); // fails at some printers
fprintf(o,"showpage\n%c%cTrailer",'%','%'); fclose(o);
system("epstopdf sqrt2tetatema.eps");
system( "open sqrt2tetatema.pdf"); //for linux
// getchar(); system("killall Preview"); // For macintosh
}
C++ generator boundaries of the shading
/* Files ado.cin, conto.cin, sqrt2f21e.cin should be loaded in order to compile the code below.*/
#include <math.h>
#include <stdio.h>
#include <stdlib.h>
#define DB double
#define DO(x,y) for(x=0;x<y;x++)
#include <complex>
typedef std::complex<double> z_type;
#define Re(x) x.real()
#define Im(x) x.imag()
#define I z_type(0.,1.)
#include "conto.cin"
// #include "tq2e.cin"
// #include "tq2L.cin"
#include "sqrt2f21e.cin"
#include "sqrt2f21l.cin"
int main(){ int j,k,m,n; DB x,y, p,q, t; z_type z,c,d, cu,cd;
int M=201,M1=M+1;
int N=401,N1=N+1;
DB X[M1],Y[N1], g[M1*N1],f[M1*N1], w[M1*N1]; // w is working array.
char v[M1*N1]; // v is working array
FILE *o;o=fopen("sqrt2tetatemb.eps","w"); ado(o,0,0,214,212);
fprintf(o,"112 110 translate\n 10 10 scale\n");
// DB sy=10.1/sinh(N/2./100.);
DO(m,M1) X[m]=0+.05*(m-.5);
DO(n,N1) Y[n]=-10+.05*(n-.5);
for(m=-10;m<11;m++) {M(m,-10)L(m,10)}
for(n=-10;n<11;n++) {M( -10,n)L(10,n)} fprintf(o,".006 W 0 0 0 RGB S\n");
DO(m,M1)DO(n,N1){ g[m*N1+n]=9999;
f[m*N1+n]=9999;}
M(-10, 2./log(2.)*M_PI) L( 10, 2./log(2.)*M_PI)
M(-10,-2./log(2.)*M_PI) L( 10,-2./log(2.)*M_PI)
p=96.;
DO(m,M1){x=X[m];
DO(n,N1){y=Y[n]; z=z_type(x,y);
c=exp(.5*log(2.)*z);
p=Re(c); q=Im(c);
if(p>-99 && p<99) g[m*N1+n]=p;
if(q>-99 && q<99 && fabs(q)>1.e-18) f[m*N1+n]=q;
}}
p=2;q=1;
conto(o,f,w,v,X,Y,M,N, (2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W .6 0 .6 RGB S\n");
conto(o,f,w,v,X,Y,M,N, (-2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W .6 0 .6 RGB S\n");
DO(m,M1){x=X[m];
DO(n,N1){y=Y[n]; z=z_type(x,y);
c=exp(.5*log(2.)*z);
c=exp(.5*log(2.)*c);
p=Re(c); q=Im(c);
if(p>-99 && p<99) g[m*N1+n]=p;
if(q>-99 && q<99 && fabs(q)>1.e-18) f[m*N1+n]=q;
}}
p=96.;
conto(o,f,w,v,X,Y,M,N, (2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W .6 0 0 RGB S\n");
conto(o,f,w,v,X,Y,M,N, (-2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W .6 0 0 RGB S\n");
DO(m,M1){x=X[m];
DO(n,N1){y=Y[n]; z=z_type(x,y);
c=exp(.5*log(2.)*z);
c=exp(.5*log(2.)*c);
c=exp(.5*log(2.)*c);
p=Re(c); q=Im(c);
if(p>-99 && p<99) g[m*N1+n]=p;
if(q>-99 && q<99 && fabs(q)>1.e-18) f[m*N1+n]=q;
}}
p=96.;
conto(o,f,w,v,X,Y,M,N, (2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W 0 0 .6 RGB S\n");
conto(o,f,w,v,X,Y,M,N, (-2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W 0 0 .6 RGB S\n");
DO(m,M1){x=X[m];
DO(n,N1){y=Y[n]; z=z_type(x,y);
c=exp(.5*log(2.)*z);
c=exp(.5*log(2.)*c);
c=exp(.5*log(2.)*c);
c=exp(.5*log(2.)*c);
p=Re(c); q=Im(c);
if(p>-99 && p<99) g[m*N1+n]=p;
if(q>-99 && q<99 && fabs(q)>1.e-18) f[m*N1+n]=q;
}}
p=96.;
conto(o,f,w,v,X,Y,M,N, (2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W .0 .5 0 RGB S\n");
conto(o,f,w,v,X,Y,M,N, (-2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W 0 .5 0 RGB S\n");
DO(m,M1){x=X[m];
DO(n,N1){y=Y[n]; z=z_type(x,y);
c=exp(.5*log(2.)*z);
c=exp(.5*log(2.)*c);
c=exp(.5*log(2.)*c);
c=exp(.5*log(2.)*c);
c=exp(.5*log(2.)*c);
p=Re(c); q=Im(c);
if(p>-99 && p<99) g[m*N1+n]=p;
if(q>-99 && q<99 && fabs(q)>1.e-18) f[m*N1+n]=q;
}}
p=96.;
conto(o,f,w,v,X,Y,M,N, (2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W .0 0 0 RGB S\n");
conto(o,f,w,v,X,Y,M,N, (-2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W 0 0 0 RGB S\n");
DO(m,M1){x=X[m];
DO(n,N1){y=Y[n]; z=z_type(x,y);
c=exp(.5*log(2.)*z);
c=exp(.5*log(2.)*c);
c=exp(.5*log(2.)*c);
c=exp(.5*log(2.)*c);
c=exp(.5*log(2.)*c);
c=exp(.5*log(2.)*c);
p=Re(c); q=Im(c);
if(p>-99 && p<99) g[m*N1+n]=p;
if(q>-99 && q<99 && fabs(q)>1.e-18) f[m*N1+n]=q;
}}
p=96.;
conto(o,f,w,v,X,Y,M,N, (2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W .0 0 0 RGB S\n");
conto(o,f,w,v,X,Y,M,N, (-2./log(2.)*M_PI ),-p,p);fprintf(o,".06 W 0 0 0 RGB S\n");
/*
p=4;q=1;
for(m=-10;m<10;m++) for(n=2;n<10;n+=2)conto(o,f,w,v,X,Y,M,N,(m+.1*n),-q, q);
fprintf(o,".01 W 0 .6 0 RGB S\n");
for(m=0;m<10;m++) for(n=2;n<10;n+=2)conto(o,g,w,v,X,Y,M,N,-(m+.1*n),-q, q);
fprintf(o,".01 W .9 0 0 RGB S\n");
for(m=0;m<10;m++) for(n=2;n<10;n+=2)conto(o,g,w,v,X,Y,M,N, (m+.1*n),-q, q);
fprintf(o,".01 W 0 0 .9 RGB S\n");
for(m=1;m<11;m++) conto(o,f,w,v,X,Y,M,N, (0.-m),-p,p);fprintf(o,".06 W .9 0 0 RGB S\n");
for(m=1;m<11;m++) conto(o,f,w,v,X,Y,M,N, (0.+m),-p,p);fprintf(o,".06 W 0 0 .9 RGB S\n");
conto(o,f,w,v,X,Y,M,N, (0. ),-p,p);fprintf(o,".06 W .6 0 .6 RGB S\n");
for(m=-10;m<11;m++)conto(o,g,w,v,X,Y,M,N,(0.+m),-p,p);fprintf(o,".06 W 0 0 0 RGB S\n");
*/
// #include "plofu.cin"
// M(-13.2,0)L(2,0) fprintf(o,".05 W 0 .8 0 RGB S\n");
//M(2,0)L(10.1,0)fprintf(o,".05 W 1 1 1 RGB S\n");
//DO(n,27){M(2+.3*n,0)L(2+.3*(n+.5) ,0)} fprintf(o,".1 W 0 0 0 RGB S\n");
fprintf(o,"showpage\n%c%cTrailer",'%','%'); fclose(o);
system("epstopdf sqrt2tetatemb.eps");
system( "open sqrt2tetatemb.pdf"); //for linux
// getchar(); system("killall Preview"); // For macintosh
}
</nowiki></nomathjax></poem>
==[[Latex]] combiner==
Files generated with codes above
should be loaded in order to compile the code below.
<poem><nomathjax><nowiki>
\documentclass[12pt]{article}
\paperwidth 422px
\paperheight 418px
\textwidth 1394px
\textheight 1300px
\topmargin -94px
\oddsidemargin -76px
\usepackage{graphics}
\usepackage{rotating}
\newcommand \sx {\scalebox}
\newcommand \rot {\begin{rotate}}
\newcommand \ero {\end{rotate}}
\newcommand \ing {\includegraphics}
\newcommand \rmi {\mathrm{i}}
\parindent 0pt
\pagestyle{empty}
\begin{document}\parindent 0pt
\sx{2}{\begin{picture}(204,204)
\put(0,0){\ing{sqrt2tetatema}}
\put(0,0){\ing{sqrt2tetatemb}}
\put(6,206){\sx{.8}{$y$}}
\put(6,188){\sx{.8}{$8$}}
\put(6,168){\sx{.8}{$6$}}
\put(6,148){\sx{.8}{$4$}}
\put(6,128){\sx{.8}{$2$}}
\put(6,108){\sx{.8}{$0$}}
\put(-1, 88){\sx{.8}{$-2$}}
\put(-1, 68){\sx{.8}{$-4$}}
\put(-1, 48){\sx{.8}{$-6$}}
\put(-1, 28){\sx{.8}{$-8$}}
\put(24,2){\sx{.8}{$-8$}}
\put(44,2){\sx{.8}{$-6$}}
\put(64,2){\sx{.8}{$-4$}}
\put(84,2){\sx{.8}{$-2$}}
\put(110.5,2){\sx{.8}{$0$}}
\put(130.5,2){\sx{.8}{$2$}}
\put(150.5,2){\sx{.8}{$4$}}
\put(170.5,2){\sx{.8}{$6$}}
\put(190.5,2){\sx{.8}{$8$}}
\put(208.6,2){\sx{.8}{$x$}}
\put(26,107.4){$v\!=\!0$}
%\put(176,108){\bf cut}
\put(115.4,57.4){\rot{90}$u\!=\!0$\ero}
\end{picture}}
\end{document}
Refereces
- ↑ https://mizugadro.mydns.jp/BOOK/468.pdf Dmitrii Kouznetsov. Superfunctions. Lambert Academic Publishing, 2020.
- ↑ https://mizugadro.mydns.jp/BOOK/202.pdf Дмитрий Кузнецов. Суперфункции. Lambert Academic Publishing, 2020.
- ↑
http://www.ams.org/journals/mcom/2010-79-271/S0025-5718-10-02342-2/home.html
http://mizugadro.mydns.jp/PAPERS/2010sqrt2.pdf offprint D.Kouznetsov, H.Trappmann. Portrait of the four regular super-exponentials to base sqrt(2). Mathematics of Computation, 2010, v.79, p.1727-1756.
Keywords
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«Agreement», «Arctetration», «Base sqrt2», «Book», «BookMap», «C++», «Complex map», «Identity function», «Inverse function», «Latex», «Mathematics of Computation», «Superfunction», «Superfunctions», «Tetration»,
«Тетрация»,
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