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FractalMonster — Extending Worm1
by-nc-sa
#nonic #parameterspace
Published: 2019-01-04 15:37:58 +0000 UTC; Views: 678; Favourites: 33; Downloads: 17
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Description
The following motives in the Extended Worm series also have the motive as start fractal. See my journal My Silver Curving SeriesALL of my motives in the Silver Curving series comes from the Nonic parameter space, a 16 dimensional space has the motive as start fractal. Then the motive is zoomed in the little tiny dot in the middle upper portion of that fractal. The parent fractal is drawn with respect to ALL the 8 subsets, M1-8 using the technique of SetBorders, see article 19b in my Chaotic series of fractal articles. That article is dealing with Cubics, but that technique is applicable to any other parameter space which has 2 or more subsets. The 2D slice from which this parent fractal (and of cause the zoom-ins) is in the slice,*a_real = #pixel (horizontal)
*a_imag = #pixel (vertical)
*b_real = 0.1
*b_imag = 0
*c_real = 0
*c_imag = 0.1
*d_real = 0.1
*d_imag = 0
*e_real = . However in this series I’ve zoomed into the little tag sticking out from the black area in the upper middle part of this start fractal. From there I've performed the Julia morphings .
Below the UF parameter file, play and have fun
ExtendingWorm1 {
fractal:
title="Extending Worm1" width=800 height=600 layers=1
credits="Ingvar Kullberg;12/20/2018"
layer:
caption="NCL+SetBorders" opacity=100 method=multipass
mapping:
center=0.1294772144663504446893059497222269572/0.7751489227945419157\
9085072296041912915 magn=7.6517811E23
formula:
maxiter=10000 filename="sp3.ufm" entry="NonicParameterspace3"
p_PlottedPlane="1.(a-real,a-imag)" p_M=M8 p_SetBorders=no p_hide=yes
p_areal=0.0 p_aimag=0.0 p_breal=0.1 p_bimag=0.0 p_creal=0.0
p_cimag=0.1 p_dreal=0.1 p_dimag=0.0 p_ereal=0.0 p_eimag=0.1
p_freal=0.1 p_fimag=0.0 p_greal=0.0 p_gimag=0.1 p_hreal=0.0
p_himag=0.0 p_xrot=0.0 p_yrot=0.0 p_xrott=0.0 p_yrott=0.0
p_xrotu=0.0 p_yrotu=0.0 p_xrotv=0.0 p_yrotv=0.0 p_xrotr=0.0
p_yrotr=0.0 p_xrots=0.0 p_yrots=0.0 p_xrota=0.0 p_yrota=0.0
p_xrotb=0.0 p_yrotb=0.0 p_xrotc=0.0 p_yrotc=0.0 p_xrotd=0.0
p_yrotd=0.0 p_xrote=0.0 p_yrote=0.0 p_xrotf=0.0 p_yrotf=0.0
p_xrotg=0.0 p_yrotg=0.0 p_xroth=0.0 p_yroth=0.0 p_zrot=0.0
p_LocalRot=no p_diff=no p_bailout=1000.0 p_dbailout=1E-6
inside:
transfer=none
outside:
density=2 transfer=linear filename="spr.ucl"
entry="ContinousPotential" p_auto=yes p_auton=2.0 p_n=7 p_numfact=5
p_scale=1.0 p_smooth=no p_epsilon=0.5 p_illustr=no p_limiton=no
p_limit=0.1 p_index3=0.0 p_index1=0.99 p_index2=0.0 p_speed=0.5
p_acc=1.0 p_clog=yes p_power=9.0 p_reversed=no p_test=no
p_testvalue=0.7 p_index4=0.29
gradient:
smooth=yes rotation=-67 index=20 color=16777212 index=51
color=1709847 index=63 color=16579582 index=70 color=3026462
index=105 color=223 index=147 color=459007 index=-191 color=57075
opacity:
smooth=no index=0 opacity=255
}
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Comments: 11
👍: 1 ⏩: 1
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When not having snow outside so at least in some fractals
Thanks again, Lea and thanks for the 
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You like one of my raw fractals 
BTW, thanks for the
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I read about Benoit Mandelbrot many years ago, and I love the fantastic art which can be made with them.
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(if the external links don't work, right-click them!)
Maybe you would appreciate my Chaotic series of fractal articles (<- right click if the link doesn't work) if you have a little theoretical interest 
Regarding deep zooms in the Mandelbrot set, if you check out my deviation Cauliflowerfort and click the link under "Artist's Comments", from page 4 you can follow the entire zoom sequence in 28 steps
In this journal you have some links to cool fractal animations I stumbled over at YouTube. Also check out the zoom videos in this journal
.. and from the middle of the nineties there is a fantastic TV program about fractals, Colors of Infinity by Arthur Clarke
👍: 0 ⏩: 1