Safe Haskell | None |
---|---|
Language | Haskell2010 |
Synopsis
- envelope :: Geometry a -> Some Geometry
- intersection :: Geometry a -> Geometry b -> Some Geometry
- convexHull :: Geometry a -> Geometry Polygon
- difference :: Geometry a -> Geometry b -> Some Geometry
- symmetricDifference :: Geometry a -> Geometry b -> Some Geometry
- boundary :: Geometry a -> Some Geometry
- union :: Geometry a -> Geometry b -> Some Geometry
- unaryUnion :: Geometry a -> Some Geometry
- pointOnSurface :: Geometry a -> Geometry Point
- centroid :: Geometry a -> Geometry Point
- node :: Geometry a -> Some Geometry
- delaunayTriangulation :: Geometry a -> Double -> Geometry MultiLineString
Documentation
envelope :: Geometry a -> Some Geometry Source #
Returns a Polygon that represents the bounding envelope of this geometry. Note that it can also return a Point if the input geometry is a point.
intersection :: Geometry a -> Geometry b -> Some Geometry Source #
Returns a Geometry representing the points shared by both geometries.
convexHull :: Geometry a -> Geometry Polygon Source #
Returns the smallest Polygon that contains all the points in the geometry.
difference :: Geometry a -> Geometry b -> Some Geometry Source #
Returns a Geometry representing the points making up this geometry that do not make up other.
symmetricDifference :: Geometry a -> Geometry b -> Some Geometry Source #
Returns a Geometry combining the points in this geometry not in other, and the points in other not in this geometry.
union :: Geometry a -> Geometry b -> Some Geometry Source #
Returns a Geometry representing all the points in both geometries.
Computes the union of all the elements of this geometry. Heterogeneous GeometryCollections are fully supported.
The result obeys the following contract:
Unioning a set of LineStrings has the effect of fully noding and dissolving the linework. Unioning a set of Polygons will always return a Polygonal geometry (unlike {link #union(Geometry)}, which may return geometrys of lower dimension if a topology collapse occurred.
pointOnSurface :: Geometry a -> Geometry Point Source #
Computes and returns a Point guaranteed to be on the interior of this geometry.
centroid :: Geometry a -> Geometry Point Source #
Returns a Point object representing the geometric center of the geometry. The point is not guaranteed to be on the interior of the geometry.
delaunayTriangulation :: Geometry a -> Double -> Geometry MultiLineString Source #
Return a Delaunay triangulation of the vertex of the given geometry g
, where tol
is the snapping tolerance to use.