| /dports/graphics/povray36/povray-3.6.1/scenes/objects/ |
| H A D | fractal4.pov | 12 hypercomplex
|
| H A D | fractal2.pov | 35 hypercomplex
|
| /dports/graphics/mandelbulber/mandelbulber2-2.26/mandelbulber2/tools/DOE/ |
| H A D | RESULTS-SCALABILITY.md | 73 | KM/hypercomplex 03.fract | 994.4131091 | 237.03706 | 972.418053…
159 | KM/hypercomplex 03.fract | 1027.497295 | 222.1898019 | 1053.14225…
245 | KM/hypercomplex 03.fract | 1062.989598 | 222.5908151 | 1026.57160…
331 | KM/hypercomplex 03.fract | 992.029516 | 235.536284 | 1018.77064…
417 | KM/hypercomplex 03.fract | 960.584003 | 242.6330259 | 1007.78375…
503 | KM/hypercomplex 03.fract | 975.687484 | 236.604507 | 1010.00492…
589 | KM/hypercomplex 03.fract | 1049.451444 | 226.169625 | 1052.60799…
675 | KM/hypercomplex 03.fract | 938.9016819 | 224.1884699 | 1038.29583…
|
| H A D | README.md | 312 | KM/hypercomplex 03 |
|
| /dports/graphics/mandelbulber/mandelbulber2-2.26/mandelbulber2/formula/definition/ |
| H A D | fractal_hypercomplex.cpp | 21 internalID = fractal::hypercomplex; in cFractalHypercomplex()
|
| H A D | all_fractal_list_enums.hpp | 47 hypercomplex = 4, enumerator
|
| /dports/graphics/povray38/povunix-v3.8.0-beta.2-src/scenes/objects/ |
| H A D | fractal4.pov | 17 hypercomplex
|
| H A D | fractal2.pov | 40 hypercomplex
|
| /dports/graphics/povray37/povray-3.7.0.10/distribution/scenes/objects/ |
| H A D | fractal4.pov | 17 hypercomplex
|
| H A D | fractal2.pov | 40 hypercomplex
|
| /dports/games/freeminer/freeminer-0.4.10.4/src/mandelbulber/ |
| H A D | fractal.h | 33 hypercomplex = 4, enumerator
|
| /dports/textproc/highlight/highlight-4.1/langDefs/ |
| H A D | pov.lang | 36 "green", "halo", "hexagon", "hf_gray_16", "hierarchy", "hollow", "hypercomplex",
|
| /dports/graphics/mandelbulber/mandelbulber2-2.26/.spelling/ |
| H A D | mandelbulber.dic | 48 hypercomplex
|
| /dports/graphics/mandelbulber/mandelbulber2-2.26/mandelbulber2/formula/opencl/ |
| H A D | hypercomplex_v2.cl | 12 * https://nylander.wordpress.com/category/fractals/hypercomplex/
|
| /dports/graphics/mandelbulber/mandelbulber2-2.26/mandelbulber2/src/ |
| H A D | old_settings.hpp | 69 hypercomplex = 4, enumerator
|
| /dports/print/a2ps/a2ps-4.13/sheets/ |
| H A D | pov.ssh | 63 hierarchy, hollow, hypercomplex, iff, image_map, incidence,
|
| /dports/games/freeminer/freeminer-0.4.10.4/ |
| H A D | CHANGELOG.md | 34 menger_sponge, hypercomplex, xenodreambuie, mandelbox, ...
|
| /dports/graphics/povray38/povunix-v3.8.0-beta.2-src/source/ |
| H A D | Makefile.in | 219 core/math/chi2.$(OBJEXT) core/math/hypercomplex.$(OBJEXT) \
349 core/math/$(DEPDIR)/hypercomplex.Po \
598 …ial/warp.h core/math/chi2.cpp core/math/chi2.h core/math/hypercomplex.cpp core/math/hypercomplex.h…
924 core/math/hypercomplex.$(OBJEXT): core/math/$(am__dirstamp) \
1252 @AMDEP_TRUE@@am__include@ @am__quote@core/math/$(DEPDIR)/hypercomplex.Po@am__quote@ # am--include-m…
1611 -rm -f core/math/$(DEPDIR)/hypercomplex.Po
1816 -rm -f core/math/$(DEPDIR)/hypercomplex.Po
|
| /dports/x11-toolkits/scintilla/scite/src/ |
| H A D | pov.properties | 87 quaternion hypercomplex linear_sweep conic_sweep \
|
| /dports/editors/scite/scite/src/ |
| H A D | pov.properties | 87 quaternion hypercomplex linear_sweep conic_sweep \
|
| /dports/editors/neovim/neovim-0.6.1/runtime/syntax/ |
| H A D | pov.vim | 43 syn keyword povModifiers hypercomplex max_iteration precision quaternion slice
|
| /dports/editors/vim/vim-8.2.3745/runtime/syntax/ |
| H A D | pov.vim | 43 syn keyword povModifiers hypercomplex max_iteration precision quaternion slice
|
| /dports/games/freeminer/freeminer-0.4.10.4/src/ |
| H A D | mapgen_math.cpp | 333 par.formula = hypercomplex; in MapgenMath()
|
| /dports/graphics/xfractint/xfractint-20.04p16/dos_help/ |
| H A D | help5.src | 937 considered the alternative called the hypercomplex number system.
938 Unlike quaternions, the hypercomplex numbers satisfy the commutative law of
941 hypercomplex number h, the multiplicative inverse 1/h does not always exist.
947 Multiplication rules for hypercomplex basis vectors:
972 A look at this formula shows the difficulty with hypercomplex numbers.
979 hypercomplex numbers can be represented as a pair of complex numbers in the
987 complex numbers (a,b). Conversely, if we have a hypercomplex number given
1001 x, y, z, and w in terms of c and d. The hypercomplex number (x,y,z,w) thus
1498 Master's thesis makes the case for using hypercomplex numbers rather than
1500 implementation of hypercomplex fractals.
|
| H A D | help2.src | 289 {=HT_HYPERC hypercomplex}
2353 (type=hypercomplex,hypercomplexj)
2355 These fractals are based on hypercomplex numbers, which like quaternions
2363 time but not all the time for hypercomplex numbers.
2365 However hypercomplex numbers have a wonderful property for fractal purposes.
2367 to hypercomplex numbers. Fractint's implementation takes advantage of this
2370 where "fn" is the hypercomplex generalization of sin, cos, log, sqr etc.
2846 dimensional fractal types quat, quatj, hypercomplex, or hypercomplexj,
|