qhull: Delaunay triangulation, Voronoi diagrams and convex hulls.

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Based on the qhull C library. Maintenance version to bring it up to current ghc-version (ghc-8.10.7, lts-18.28).


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Modules

  • ConvexHull
    • ConvexHull.BiTruncatedTesseract
    • ConvexHull.CConvexHull
    • CantiTrunc600Cell
      • ConvexHull.CantiTrunc600Cell.Data
    • ConvexHull.ConvexHull
    • ConvexHull.Examples
    • ConvexHull.OmniTruncated120Cell
    • ConvexHull.R
    • SnubDodecahedron
      • ConvexHull.SnubDodecahedron.SnubDodecahedron
    • ConvexHull.Truncated120Cell3
    • ConvexHull.Types
  • Delaunay
    • Delaunay.Adjacency
    • Delaunay.CDelaunay
    • Delaunay.Delaunay
    • Delaunay.Examples
    • Delaunay.R
    • Delaunay.Types
  • HalfSpaces
    • HalfSpaces.CHalfSpaces
    • HalfSpaces.Constraint
    • HalfSpaces.Examples
    • HalfSpaces.HalfSpaces
    • HalfSpaces.Internal
    • HalfSpaces.LinearCombination
    • HalfSpaces.ToySolver
  • Qhull
    • Qhull.Shared
    • Qhull.Types
  • Voronoi
    • Voronoi.R
    • Voronoi.Shared
    • Voronoi.Voronoi
  • Voronoi2D
  • Voronoi3D

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Versions [RSS] 0.1.0.1, 0.1.0.3, 0.1.0.4
Change log ChangeLog.md
Dependencies base (>=4.7 && <5), combinat, containers, data-default-class, extra, hashable, ilist, insert-ordered-containers, optparse-applicative, pretty-show, qhull, random, regex-base, regex-compat, regex-posix, split, toysolver, Unique, vector-algorithms (==0.8.0.3), vector-space [details]
License GPL-3.0-only
Copyright 2018 Stéphane Laurent
Author Stéphane Laurent
Maintainer Andrew U. Frank
Category Math
Home page https://github.com/stla/qhull#readme
Source repo head: git clone https://github.com/stla/qhull
Uploaded by andrewufrank at 2022-08-06T21:48:07Z
Distributions
Executables adjacencymatrix, test_halfspaces, test_convexhull, test_voronoi, test_delaunay
Downloads 208 total (4 in the last 30 days)
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Status Docs not available [build log]
All reported builds failed as of 2022-08-07 [all 2 reports]

Readme for qhull-0.1.0.4

[back to package description]

qhull

Delaunay triangulation, Voronoi diagrams and convex hulls. Based on the qhull C library.

Delaunay tesselation

Consider this list of vertices (actually these are the vertices of a polyhedron):

vertices = [
            [ -5, -5,  16 ]  -- 0
          , [ -5,  8,   3 ]  -- 1
          , [  4, -1,   3 ]  -- 2
          , [  4, -5,   7 ]  -- 3
          , [  4, -1, -10 ]  -- 4
          , [  4, -5, -10 ]  -- 5
          , [ -5,  8, -10 ]  -- 6
          , [ -5, -5, -10 ]  -- 7
                           ]

The delaunay function splits the polyhedron into simplices, the tiles of the tesselation:

> import Delaunay
> d <- delaunay vertices False False
> _tiles d
fromList
  [ ( 0
    , Tile
        { _simplex =
            Simplex
              { _points =
                  fromList
                    [ ( 2 , [ 4.0 , -1.0 , 3.0 ] )
                    , ( 4 , [ 4.0 , -1.0 , -10.0 ] )
                    , ( 5 , [ 4.0 , -5.0 , -10.0 ] )
                    , ( 7 , [ -5.0 , -5.0 , -10.0 ] )
                    ]
              , _circumcenter =
                  [ -0.5000000000000009 , -3.0 , -3.499999999999999 ]
              , _circumradius = 8.154753215150047
              , _volume = 78.0
              }
        , _neighborsIds = fromList [ 1 , 3 ]
        , _facetsIds = fromList [ 0 , 1 , 2 , 3 ]
        , _family = Nothing
        , _toporiented = False
        }
    )
  , ( 1
    , Tile
        { _simplex =
  ......

The field _tiles is a map of Tile objects. The keys of the map are the tiles identifiers. A Tile object has five fields:

  • _simplex, a Simplex object;

  • _neighborsIds, a set of tiles identifiers, the neighbors of the tile;

  • facetsIds, a set of facets identifiers, the facets of the tile;

  • family, two tiles of the same family share the same circumcenter;

  • toporiented, Boolean, whether the tile is top-oriented.

A Simplex object has four fields:

  • _points, the vertices of the simplex, actually a map of the vertices identifiers to their coordinates

  • _circumcenter, the coordinates of the circumcenter of the simplex;

  • _circumradius, the circumradius;

  • _volume, the volume of the simplex (the area in dimension 2, the length in dimension 1).

Another field of the output of delaunay is _tilefacets:

> _tilefacets d
fromList
  [ ( 0
    , TileFacet
        { _subsimplex =
            Simplex
              { _points =
                  fromList
                    [ ( 4 , [ 4.0 , -1.0 , -10.0 ] )
                    , ( 5 , [ 4.0 , -5.0 , -10.0 ] )
                    , ( 7 , [ -5.0 , -5.0 , -10.0 ] )
                    ]
              , _circumcenter = [ -0.5000000000000009 , -3.0 , -10.0 ]
              , _circumradius = 4.924428900898053
              , _volume = 36.0
              }
        , _facetOf = fromList [ 0 ]
        , _normal = [ 0.0 , 0.0 , -1.0 ]
        , _offset = -10.0
        }
    )
  , ( 1
    , TileFacet
        { _subsimplex =
  ......

This is a map of TileFacet objects. A tile facet is a subsimplex. The keys of the map are the identifiers of the facets. A TileFacet object has four fields: _subsimplex, a Simplex object, _facetOf, the identifiers of the tiles this facet belongs to (a set of one or two integers), _normal, the normal of the facet, and offset, the offset of the facet.

Finally, the output of delaunay has a _sites field, the vertices with additional information:

> _sites d
fromList
  [ ( 0
    , Site
        { _point = [ -5.0 , -5.0 , 16.0 ]
        , _neighsitesIds = fromList [ 1 , 3 , 7 ]
        , _neighfacetsIds = fromList [ 15 , 16 , 17 ]
        , _neightilesIds = fromList [ 5 ]
        }
    )
  , ( 1
    , Site
  ......

This is a map of Site objects. The keys of the map are the identifiers of the vertices. A Site object has four fields:

  • _point, the coordinates of the vertex;

  • _neighsitesIds, the identifiers of the connected vertices;

  • _neighfacetsIds, a set of integers, the identifiers of the facets the vertex belongs to;

  • _neightilesIds, the set of the identifiers of the tiles the vertex belongs to.

gfycat

Voronoi diagrams

The library allows to get the Voronoi diagram of a list of sites (vertices) from the Delaunay tesselation. Here is a 3D example.

centricCuboctahedron :: [[Double]]
centricCuboctahedron = [[i,j,0] | i <- [-1,1], j <- [-1,1]] ++
                       [[i,0,j] | i <- [-1,1], j <- [-1,1]] ++
                       [[0,i,j] | i <- [-1,1], j <- [-1,1]] ++
                       [[0,0,0]]
import Delaunay
import Voronoi3D
d <- delaunay centricCuboctahedron False False
v = voronoi3 d

In some circumstances, one has to run the Delaunay tesselation including the degenerate tiles in order to get the correct Voronoi diagram, that is to say delaunay vertices False True.

The output of voronoi3 is a list of Voronoi cells given as pairs, each pair consisting of a site and a list of edges. This is the cell of the center [0, 0, 0]:

> last v
( [ 0.0 , 0.0 , 0.0 ]
, [ Edge3 ( ( -0.5 , -0.5 , 0.5 ) , ( 0.0 , 0.0 , 1.0 ) )
  , Edge3 ( ( -0.5 , -0.5 , 0.5 ) , ( 0.0 , -1.0 , 0.0 ) )
  , Edge3 ( ( -0.5 , -0.5 , 0.5 ) , ( -1.0 , 0.0 , 0.0 ) )
  , Edge3 ( ( -0.5 , 0.5 , 0.5 ) , ( 0.0 , 0.0 , 1.0 ) )
  , Edge3 ( ( -0.5 , 0.5 , 0.5 ) , ( 0.0 , 1.0 , 0.0 ) )
  , Edge3 ( ( -0.5 , 0.5 , 0.5 ) , ( -1.0 , 0.0 , 0.0 ) )
  , Edge3 ( ( 0.5 , -0.5 , 0.5 ) , ( 0.0 , 0.0 , 1.0 ) )
  , Edge3 ( ( 0.5 , -0.5 , 0.5 ) , ( 0.0 , -1.0 , 0.0 ) )
  , Edge3 ( ( 0.5 , -0.5 , 0.5 ) , ( 1.0 , 0.0 , 0.0 ) )
  , Edge3 ( ( 0.5 , 0.5 , 0.5 ) , ( 0.0 , 0.0 , 1.0 ) )
  , Edge3 ( ( 0.5 , 0.5 , 0.5 ) , ( 0.0 , 1.0 , 0.0 ) )
  , Edge3 ( ( 0.5 , 0.5 , 0.5 ) , ( 1.0 , 0.0 , 0.0 ) )
  , Edge3 ( ( -0.5 , -0.5 , -0.5 ) , ( 0.0 , 0.0 , -1.0 ) )
  , Edge3 ( ( -0.5 , -0.5 , -0.5 ) , ( 0.0 , -1.0 , 0.0 ) )
  , Edge3 ( ( -0.5 , -0.5 , -0.5 ) , ( -1.0 , 0.0 , 0.0 ) )
  , Edge3 ( ( -0.5 , 0.5 , -0.5 ) , ( 0.0 , 0.0 , -1.0 ) )
  , Edge3 ( ( -0.5 , 0.5 , -0.5 ) , ( 0.0 , 1.0 , 0.0 ) )
  , Edge3 ( ( -0.5 , 0.5 , -0.5 ) , ( -1.0 , 0.0 , 0.0 ) )
  , Edge3 ( ( 0.5 , -0.5 , -0.5 ) , ( 0.0 , 0.0 , -1.0 ) )
  , Edge3 ( ( 0.5 , -0.5 , -0.5 ) , ( 0.0 , -1.0 , 0.0 ) )
  , Edge3 ( ( 0.5 , -0.5 , -0.5 ) , ( 1.0 , 0.0 , 0.0 ) )
  , Edge3 ( ( 0.5 , 0.5 , -0.5 ) , ( 0.0 , 0.0 , -1.0 ) )
  , Edge3 ( ( 0.5 , 0.5 , -0.5 ) , ( 0.0 , 1.0 , 0.0 ) )
  , Edge3 ( ( 0.5 , 0.5 , -0.5 ) , ( 1.0 , 0.0 , 0.0 ) )
  ]
)

This is a bounded cell: it has finite edges only. The other ones are not bounded, they have infinite edges:

> head v
( [ -1.0 , -1.0 , 0.0 ]
, [ Edge3 ( ( -0.5 , -0.5 , 0.5 ) , ( 0.0 , -1.0 , 0.0 ) )
  , Edge3 ( ( -0.5 , -0.5 , 0.5 ) , ( -1.0 , 0.0 , 0.0 ) )
  , IEdge3
      ( ( -0.5 , -0.5 , 0.5 )
      , ( -0.5773502691896258 , -0.5773502691896258 , 0.5773502691896258 )
      )
  , Edge3 ( ( -0.5 , -0.5 , -0.5 ) , ( 0.0 , -1.0 , 0.0 ) )
  , Edge3 ( ( -0.5 , -0.5 , -0.5 ) , ( -1.0 , 0.0 , 0.0 ) )
  , IEdge3
      ( ( -0.5 , -0.5 , -0.5 )
      , ( -0.5773502691896258 , -0.5773502691896258 , -0.5773502691896258 )
      )
  , IEdge3 ( ( -1.0 , 0.0 , 0.0 ) , ( 1.0 , 0.0 , 0.0 ) )
  , IEdge3 ( ( 0.0 , -1.0 , 0.0 ) , ( 0.0 , -1.0 , 0.0 ) )
  ]
)

gfycat

Convex hull

The convexHull function of the ConvexHull module generates the convex hull of a list of points.

import ConvexHull
import ConvexHull.Examples -- for the function randomInCube
points <- randomInCube 100 -- 100 random points in a cube
hull <- convexHull points False False Nothing

The vertices of the convex hull are stored in the field _hvertices:

> _hvertices hull
fromList
  [ ( 3
    , Vertex
        { _point =
            [ 0.7872072051657094 , 0.450772463858757 , 1.9900427529711773e-2 ]
        , _neighfacets = fromList [ 42 , 43 , 47 , 48 ]
        , _neighvertices = fromList [ 1 , 11 , 64 , 88 ]
        , _neighridges = fromList [ 70 , 71 , 72 , 77 ]
        }
    )
  , ( 6
    , Vertex
  ......

The edges in the field _hedges:

> _hedges hull
fromList
  [ ( Pair 14 70
    , ( [ 0.9215432980174852 , 0.8554065771602318 , 0.9842902519648512 ]
      , [ 0.9497713758656887 , 0.998006476041318 , 0.7243639875028591 ]
      )
    )
  , ( Pair 84 99
  ......

The facets in the field _hfacets:

> _hfacets hull
fromList
  [ ( 0
    , Facet
        { _fvertices =
            fromList
              [ ( 4
                , [ 1.5757133629105136e-3
                  , 0.6442797662244039
                  , 0.7058559215899725
                  ]
                )
              , ( 67
                , [ 2.7500520534961326e-2
                  , 0.37516259577251554
                  , 0.7331611715042575
                  ]
                )
              , ( 77
                , [ 3.46399386146774e-2
                  , 5.575911794526589e-2
                  , 0.46787034305814157
                  ]
                )
              ]
        , _fridges =
            fromList
              [ ( 0
                , Ridge
                    { _rvertices =
                        fromList
                          [ ( 4
                            , [ 1.5757133629105136e-3
                              , 0.6442797662244039
                              , 0.7058559215899725
                              ]
                            )
                          , ( 77
                            , [ 3.46399386146774e-2
                              , 5.575911794526589e-2
                              , 0.46787034305814157
                              ]
                            )
                          ]
                    , _ridgeOf = fromList [ 0 , 4 ]
                    }
                )
              , ( 1
                , Ridge
                    { _rvertices =
                        fromList
                          [ ( 4
                            , [ 1.5757133629105136e-3
                              , 0.6442797662244039
                              , 0.7058559215899725
                              ]
                            )
                          , ( 67
                            , [ 2.7500520534961326e-2
                              , 0.37516259577251554
                              , 0.7331611715042575
                              ]
                            )
                          ]
                    , _ridgeOf = fromList [ 0 , 2 ]
                    }
                )
              , ( 2
                , Ridge
                    { _rvertices =
                        fromList
                          [ ( 67
                            , [ 2.7500520534961326e-2
                              , 0.37516259577251554
                              , 0.7331611715042575
                              ]
                            )
                          , ( 77
                            , [ 3.46399386146774e-2
                              , 5.575911794526589e-2
                              , 0.46787034305814157
                              ]
                            )
                          ]
                    , _ridgeOf = fromList [ 0 , 1 ]
                    }
                )
              ]
        , _centroid =
            [ 2.1238724170849748e-2 , 0.3584004933140618 , 0.6356291453841239 ]
        , _normal =
            [ -0.9930268604214181
            , -8.766369712550202e-2
            , 7.882087723357102e-2
            ]
        , _offset = 2.40848904384814e-3
        , _area = 4.0339144929987907e-2
        , _neighbors = fromList [ 1 , 2 , 4 ]
        , _family = None
        , _fedges =
            fromList
              [ ( Pair 4 67
                , ( [ 1.5757133629105136e-3
                    , 0.6442797662244039
                    , 0.7058559215899725
                    ]
                  , [ 2.7500520534961326e-2
                    , 0.37516259577251554
                    , 0.7331611715042575
                    ]
                  )
                )
              , ( Pair 67 77
                , ( [ 2.7500520534961326e-2
                    , 0.37516259577251554
                    , 0.7331611715042575
                    ]
                  , [ 3.46399386146774e-2
                    , 5.575911794526589e-2
                    , 0.46787034305814157
                    ]
                  )
                )
              , ( Pair 4 77
                , ( [ 1.5757133629105136e-3
                    , 0.6442797662244039
                    , 0.7058559215899725
                    ]
                  , [ 3.46399386146774e-2
                    , 5.575911794526589e-2
                    , 0.46787034305814157
                    ]
                  )
                )
              ]
        }
    )
  , ( 1
    , Facet
  ......

gfycat

Halfspaces intersections

equation

import HalfSpaces
import Data.Ratio ((%))
x = newVar 1
y = newVar 2
z = newVar 3
constraints =
  [ x .>=  0 -- shortcut for x .>=. cst 0
  , x .<=  3
  , y .>=  0
  , y .<=. cst 2 ^-^ (2%3)*^x
  , z .>=  0
  , z .<=. cst 6 ^-^ 2*^x ^-^ 3*^y ]
> hsintersections constraints False
[ [ -1.1102230246251565e-16 , -1.1102230246251565e-16 , 6.0 ]
, [ 0.0 , 2.0 , 0.0 ]
, [ 0.0 , 0.0 , 0.0 ]
, [ 3.0 , 0.0 , 0.0 ] ]

The convex hull of a curve on the sphere:

Imgur

The Voronoi cell of a point inside the Utah teapot:

Imgur

The Voronoi diagram of a projection of the truncated tesseract:

Imgur

The Voronoi diagram of a cube surrounded by three perpendicular circles:

Imgur