This Julia set is a tridimensional cross-section and was computed with a polynomial 'P' of the first degree and the following eight functions (where the exponent 4 as well as the multiplicative factor 4 are also called the degree):
```
P(o) = 1*o + {-0.5815147625160462,+0.6358885017421603,0,0,0,0,0,0}
```
```
4
fR(R ,R ) = (R *R )
1  2      1  2
```
```
fA1(A1 ,A1 ) = 4*(A1 +A1 )
1   2         1   2
```
```
fA2(A2 ,A2 ) = 4*(A2 +A2 )
1   2         1   2
```
```
fA3(A3 ,A3 ) = 4*(A3 +A3 )
1   2         1   2
```
```
fA4(A4 ,A4 ) = 4*(A4 +A4 )
1   2         1   2
```
```
fA5(A5 ,A5 ) = 4*(A5 +A5 )
1   2         1   2
```
```
fA6(A6 ,A6 ) = 4*(A6 +A6 )
1   2         1   2
```
```
fA7(A7 ,A7 ) = 4*(A7 +A7 )
1   2         1   2
```

See the sixteen points of view:

See some Julia sets (including this one) with various degrees:

Degree=2:
Degree=3:
Degree=4:
Degree=8:
Degree=9:

[Plus d'informations à propos des Ensembles Fractals Déterministes N-Dimensionnels (en français/in french)]

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