Struct libreda_db::layout::prelude::Polygon [−][src]
A polygon possibly with holes. The polygon is defined by a hull and a list of holes
which are both SimplePolygon
s.
Fields
exterior: SimplePolygon<T>
The outer hull of the polygon.
interiors: Vec<SimplePolygon<T>, Global>
A list of holes in the polygon.
Implementations
impl<T> Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
pub fn new<I>(i: I) -> Polygon<T> where
I: Into<Polygon<T>>,
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I: Into<Polygon<T>>,
Create a new polygon from a sequence of points.
pub fn empty() -> Polygon<T>
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Create empty polygon without any vertices.
pub fn new_with_holes<E, I>(exterior: E, holes: Vec<I, Global>) -> Polygon<T> where
I: Into<SimplePolygon<T>>,
E: Into<SimplePolygon<T>>,
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I: Into<SimplePolygon<T>>,
E: Into<SimplePolygon<T>>,
Create a new polygon from a hull and a list of holes.
pub fn len(&self) -> usize
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Get the number of vertices.
pub fn edges(&self) -> Vec<Edge<T>, Global>
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Get all exterior edges of the polygon.
pub fn convex_hull(&self) -> Polygon<T> where
T: Ord,
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T: Ord,
Get the convex hull of the polygon.
Implements Andrew's Monotone Chain algorithm. See: http://geomalgorithms.com/a10-_hull-1.html
pub fn lower_left_vertex(&self) -> Point<T>
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Get the vertex with lowest x-coordinate of the exterior polygon. Prefer lower y-coordinates to break ties.
Examples
use iron_shapes::polygon::Polygon; use iron_shapes::point::Point; let coords = vec![(0, 0), (1, 0), (-1, 2), (-1, 1)]; let poly = Polygon::new(coords); assert_eq!(poly.lower_left_vertex(), Point::new(-1, 1));
pub fn orientation(&self) -> Orientation
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Get the orientation of the exterior polygon.
Examples
use iron_shapes::polygon::Polygon; use iron_shapes::point::Point; use iron_shapes::types::Orientation; let coords = vec![(0, 0), (3, 0), (3, 1)]; let poly = Polygon::new(coords); assert_eq!(poly.orientation(), Orientation::CounterClockWise);
Trait Implementations
impl<T> Clone for Polygon<T> where
T: Clone + CoordinateType,
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T: Clone + CoordinateType,
impl<T> Debug for Polygon<T> where
T: Debug + CoordinateType,
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T: Debug + CoordinateType,
impl<T> DoubledOrientedArea<T> for Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
pub fn area_doubled_oriented(&self) -> T
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Calculates the doubled oriented area.
Using doubled area allows to compute in the integers because the area of a polygon with integer coordinates is either integer or half-integer.
The area will be positive if the vertices are listed counter-clockwise, negative otherwise.
Complexity: O(n)
Examples
use iron_shapes::polygon::{Polygon, DoubledOrientedArea}; let coords = vec![(0, 0), (3, 0), (3, 1)]; let poly = Polygon::new(coords); assert_eq!(poly.area_doubled_oriented(), 3);
impl<T> Eq for Polygon<T> where
T: Eq + CoordinateType,
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T: Eq + CoordinateType,
impl<'_, T> From<&'_ Rect<T>> for Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
Create a polygon from a rectangle.
impl<'_, T> From<&'_ SimplePolygon<T>> for Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
Create a polygon from a simple polygon.
pub fn from(simple_polygon: &SimplePolygon<T>) -> Polygon<T>
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impl<'a, T, P> From<&'a Vec<P, Global>> for Polygon<T> where
T: CoordinateType,
Point<T>: From<&'a P>,
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T: CoordinateType,
Point<T>: From<&'a P>,
Create a polygon from a Vec
of values convertible to Point
s.
impl<T> From<Polygon<T>> for Geometry<T> where
T: CoordinateType,
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T: CoordinateType,
impl<T> From<Rect<T>> for Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
Create a polygon from a rectangle.
impl<T> From<SimplePolygon<T>> for Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
Create a polygon from a simple polygon.
pub fn from(simple_polygon: SimplePolygon<T>) -> Polygon<T>
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impl<T, P> From<Vec<P, Global>> for Polygon<T> where
T: CoordinateType,
Point<T>: From<P>,
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T: CoordinateType,
Point<T>: From<P>,
Create a polygon from a Vec
of values convertible to Point
s.
impl<T, P> FromIterator<P> for Polygon<T> where
T: CoordinateType,
P: Into<Point<T>>,
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T: CoordinateType,
P: Into<Point<T>>,
Create a polygon from a iterator of values convertible to Point
s.
pub fn from_iter<I>(iter: I) -> Polygon<T> where
I: IntoIterator<Item = P>,
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I: IntoIterator<Item = P>,
impl<T> Hash for Polygon<T> where
T: Hash + CoordinateType,
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T: Hash + CoordinateType,
pub fn hash<__H>(&self, state: &mut __H) where
__H: Hasher,
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__H: Hasher,
pub fn hash_slice<H>(data: &[Self], state: &mut H) where
H: Hasher,
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H: Hasher,
impl<T> Into<Polygon<T>> for Geometry<T> where
T: CoordinateType + NumCast,
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T: CoordinateType + NumCast,
impl<T> MapPointwise<T> for Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
impl<T> PartialEq<Polygon<T>> for Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
pub fn eq(&self, rhs: &Polygon<T>) -> bool
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Equality test for polygons.
Two polygons are equal iff a cyclic shift on their vertices can be applied such that the both lists of vertices match exactly.
#[must_use]pub fn ne(&self, other: &Rhs) -> bool
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impl<T> StructuralEq for Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
impl<T> TryBoundingBox<T> for Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
pub fn try_bounding_box(&self) -> Option<Rect<T>>
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impl<T, Dst> TryCastCoord<T, Dst> for Polygon<T> where
T: CoordinateType + NumCast,
Dst: CoordinateType + NumCast,
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T: CoordinateType + NumCast,
Dst: CoordinateType + NumCast,
type Output = Polygon<Dst>
Output type of the cast. This is likely the same geometrical type just with other coordinate types. Read more
pub fn try_cast(&self) -> Option<<Polygon<T> as TryCastCoord<T, Dst>>::Output>
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pub fn cast(&self) -> Self::Output
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impl<T> WindingNumber<T> for Polygon<T> where
T: CoordinateType,
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T: CoordinateType,
pub fn winding_number(&self, point: Point<T>) -> isize
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Calculate the winding number of the polygon around this point.
TODO: Define how point on edges and vertices is handled.
See: http://geomalgorithms.com/a03-_inclusion.html
pub fn contains_point_non_oriented(&self, point: Point<T>) -> bool
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pub fn contains_point(&self, point: Point<T>) -> bool
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Auto Trait Implementations
impl<T> RefUnwindSafe for Polygon<T> where
T: RefUnwindSafe,
T: RefUnwindSafe,
impl<T> Send for Polygon<T> where
T: Send,
T: Send,
impl<T> Sync for Polygon<T> where
T: Sync,
T: Sync,
impl<T> Unpin for Polygon<T> where
T: Unpin,
T: Unpin,
impl<T> UnwindSafe for Polygon<T> where
T: UnwindSafe,
T: UnwindSafe,
Blanket Implementations
impl<T> Any for T where
T: 'static + ?Sized,
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T: 'static + ?Sized,
impl<T> Borrow<T> for T where
T: ?Sized,
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T: ?Sized,
impl<T> BorrowMut<T> for T where
T: ?Sized,
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T: ?Sized,
pub fn borrow_mut(&mut self) -> &mut T
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impl<T> From<T> for T
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impl<T, U> Into<U> for T where
U: From<T>,
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U: From<T>,
impl<S, T> Mirror<T> for S where
S: MapPointwise<T>,
T: CoordinateType,
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S: MapPointwise<T>,
T: CoordinateType,
pub fn mirror_x(&self) -> S
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Return the geometrical object mirrored at the x
axis.
pub fn mirror_y(&self) -> S
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Return the geometrical object mirrored at the y
axis.
impl<S, T> RotateOrtho<T> for S where
S: MapPointwise<T>,
T: CoordinateType,
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S: MapPointwise<T>,
T: CoordinateType,
pub fn rotate_ortho(&self, a: Angle) -> S
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impl<S, T> Scale<T> for S where
S: MapPointwise<T>,
T: CoordinateType,
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S: MapPointwise<T>,
T: CoordinateType,
impl<T> TextType for T where
T: Clone + Eq + Debug + Hash,
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T: Clone + Eq + Debug + Hash,
impl<T> ToOwned for T where
T: Clone,
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T: Clone,
type Owned = T
The resulting type after obtaining ownership.
pub fn to_owned(&self) -> T
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pub fn clone_into(&self, target: &mut T)
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impl<S, T> Translate<T> for S where
S: MapPointwise<T>,
T: CoordinateType,
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S: MapPointwise<T>,
T: CoordinateType,
impl<T, U> TryFrom<U> for T where
U: Into<T>,
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U: Into<T>,
type Error = Infallible
The type returned in the event of a conversion error.
pub fn try_from(value: U) -> Result<T, <T as TryFrom<U>>::Error>
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impl<T, U> TryInto<U> for T where
U: TryFrom<T>,
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U: TryFrom<T>,