diagrams-lib-1.4.3: Embedded domain-specific language for declarative graphics

Copyright(c) 2011-2013 diagrams-lib team (see LICENSE)
LicenseBSD-style (see LICENSE)
Maintainerdiagrams-discuss@googlegroups.com
Safe HaskellNone
LanguageHaskell2010

Diagrams.Segment

Contents

Description

A segment is a translation-invariant, atomic path. Currently, there are two types: linear (i.e. just a straight line to the endpoint) and cubic Bézier curves (i.e. a curve to an endpoint with two control points). This module contains tools for creating and manipulating segments, as well as a definition of segments with a fixed location (useful for backend implementors).

Generally speaking, casual users of diagrams should not need this module; the higher-level functionality provided by Diagrams.Trail, Diagrams.TrailLike, and Diagrams.Path should usually suffice. However, directly manipulating segments can occasionally be useful.

Synopsis

Open/closed tags

data Open Source #

Type tag for open segments.

Instances
Serialize (v n) => Serialize (Segment Open v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

put :: Putter (Segment Open v n) #

get :: Get (Segment Open v n) #

data Closed Source #

Type tag for closed segments.

Instances
(Additive v, Num n) => EndValues (Tangent (Segment Closed v n)) Source # 
Instance details

Defined in Diagrams.Tangent

(Additive v, Num n) => Parametric (Tangent (Segment Closed v n)) Source # 
Instance details

Defined in Diagrams.Tangent

ToPath (Located [Segment Closed v n]) Source # 
Instance details

Defined in Diagrams.Path

Methods

toPath :: Located [Segment Closed v n] -> Path (V (Located [Segment Closed v n])) (N (Located [Segment Closed v n])) Source #

ToPath (Located (Segment Closed v n)) Source # 
Instance details

Defined in Diagrams.Path

Methods

toPath :: Located (Segment Closed v n) -> Path (V (Located (Segment Closed v n))) (N (Located (Segment Closed v n))) Source #

(Metric v, OrderedField n, Metric u, OrderedField n') => Cons (SegTree v n) (SegTree u n') (Segment Closed v n) (Segment Closed u n') Source # 
Instance details

Defined in Diagrams.Trail

Methods

_Cons :: Prism (SegTree v n) (SegTree u n') (Segment Closed v n, SegTree v n) (Segment Closed u n', SegTree u n') #

(Metric v, OrderedField n, Metric u, OrderedField n') => Snoc (SegTree v n) (SegTree u n') (Segment Closed v n) (Segment Closed u n') Source # 
Instance details

Defined in Diagrams.Trail

Methods

_Snoc :: Prism (SegTree v n) (SegTree u n') (SegTree v n, Segment Closed v n) (SegTree u n', Segment Closed u n') #

(OrderedField n, Metric v) => Measured (SegMeasure v n) (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

measure :: Segment Closed v n -> SegMeasure v n #

Serialize (v n) => Serialize (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

put :: Putter (Segment Closed v n) #

get :: Get (Segment Closed v n) #

(Metric v, OrderedField n) => Enveloped (Segment Closed v n) Source #

The envelope for a segment is based at the segment's start.

Instance details

Defined in Diagrams.Segment

Methods

getEnvelope :: Segment Closed v n -> Envelope (V (Segment Closed v n)) (N (Segment Closed v n)) #

OrderedField n => Traced (Segment Closed V2 n) Source # 
Instance details

Defined in Diagrams.TwoD.Segment

(Additive v, Num n) => Reversing (Segment Closed v n) Source #

Reverse the direction of a segment.

Instance details

Defined in Diagrams.Segment

Methods

reversing :: Segment Closed v n -> Segment Closed v n #

(Metric v, OrderedField n) => HasArcLength (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

(Additive v, Fractional n) => Sectionable (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

(Additive v, Num n) => EndValues (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

Num n => DomainBounds (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

(Additive v, Num n) => Parametric (Segment Closed v n) Source #

atParam yields a parametrized view of segments as continuous functions [0,1] -> v, which give the offset from the start of the segment for each value of the parameter between 0 and 1. It is designed to be used infix, like seg `atParam` 0.5.

Instance details

Defined in Diagrams.Segment

Methods

atParam :: Segment Closed v n -> N (Segment Closed v n) -> Codomain (Segment Closed v n) (N (Segment Closed v n)) Source #

(Metric v, OrderedField n, Metric u, OrderedField n') => Cons (Trail' Line v n) (Trail' Line u n') (Segment Closed v n) (Segment Closed u n') Source # 
Instance details

Defined in Diagrams.Trail

Methods

_Cons :: Prism (Trail' Line v n) (Trail' Line u n') (Segment Closed v n, Trail' Line v n) (Segment Closed u n', Trail' Line u n') #

(Metric v, OrderedField n, Metric u, OrderedField n') => Snoc (Trail' Line v n) (Trail' Line u n') (Segment Closed v n) (Segment Closed u n') Source # 
Instance details

Defined in Diagrams.Trail

Methods

_Snoc :: Prism (Trail' Line v n) (Trail' Line u n') (Trail' Line v n, Segment Closed v n) (Trail' Line u n', Segment Closed u n') #

type Codomain (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

type Codomain (Segment Closed v n) = v

Segment offsets

data Offset c v n where Source #

The offset of a segment is the vector from its starting point to its end. The offset for an open segment is determined by the context, i.e. its endpoint is not fixed. The offset for a closed segment is stored explicitly, i.e. its endpoint is at a fixed offset from its start.

Constructors

OffsetOpen :: Offset Open v n 
OffsetClosed :: v n -> Offset Closed v n 
Instances
Functor v => Functor (Offset c v) Source # 
Instance details

Defined in Diagrams.Segment

Methods

fmap :: (a -> b) -> Offset c v a -> Offset c v b #

(<$) :: a -> Offset c v b -> Offset c v a #

Eq (v n) => Eq (Offset c v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

(==) :: Offset c v n -> Offset c v n -> Bool #

(/=) :: Offset c v n -> Offset c v n -> Bool #

Ord (v n) => Ord (Offset c v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

compare :: Offset c v n -> Offset c v n -> Ordering #

(<) :: Offset c v n -> Offset c v n -> Bool #

(<=) :: Offset c v n -> Offset c v n -> Bool #

(>) :: Offset c v n -> Offset c v n -> Bool #

(>=) :: Offset c v n -> Offset c v n -> Bool #

max :: Offset c v n -> Offset c v n -> Offset c v n #

min :: Offset c v n -> Offset c v n -> Offset c v n #

Show (v n) => Show (Offset c v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

showsPrec :: Int -> Offset c v n -> ShowS #

show :: Offset c v n -> String #

showList :: [Offset c v n] -> ShowS #

Transformable (Offset c v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

transform :: Transformation (V (Offset c v n)) (N (Offset c v n)) -> Offset c v n -> Offset c v n #

(Additive v, Num n) => Reversing (Offset c v n) Source #

Reverses the direction of closed offsets.

Instance details

Defined in Diagrams.Segment

Methods

reversing :: Offset c v n -> Offset c v n #

r ~ Offset c u n => AffineMappable (Offset c v n) r Source # 
Instance details

Defined in Diagrams.LinearMap

Methods

amap :: AffineMap (V (Offset c v n)) (V r) (N r) -> Offset c v n -> r Source #

r ~ Offset c u m => LinearMappable (Offset c v n) r Source # 
Instance details

Defined in Diagrams.LinearMap

Methods

vmap :: (Vn (Offset c v n) -> Vn r) -> Offset c v n -> r Source #

Each (Offset c v n) (Offset c v' n') (v n) (v' n') Source # 
Instance details

Defined in Diagrams.Segment

Methods

each :: Traversal (Offset c v n) (Offset c v' n') (v n) (v' n') #

type V (Offset c v n) Source # 
Instance details

Defined in Diagrams.Segment

type V (Offset c v n) = v
type N (Offset c v n) Source # 
Instance details

Defined in Diagrams.Segment

type N (Offset c v n) = n

segOffset :: Segment Closed v n -> v n Source #

Compute the offset from the start of a segment to the end. Note that in the case of a Bézier segment this is not the same as the length of the curve itself; for that, see arcLength.

Constructing and modifying segments

data Segment c v n Source #

The atomic constituents of the concrete representation currently used for trails are segments, currently limited to single straight lines or cubic Bézier curves. Segments are translationally invariant, that is, they have no particular "location" and are unaffected by translations. They are, however, affected by other transformations such as rotations and scales.

Constructors

Linear !(Offset c v n)

A linear segment with given offset.

Cubic !(v n) !(v n) !(Offset c v n)

A cubic Bézier segment specified by three offsets from the starting point to the first control point, second control point, and ending point, respectively.

Instances
(Additive v, Num n) => EndValues (Tangent (Segment Closed v n)) Source # 
Instance details

Defined in Diagrams.Tangent

(Additive v, Num n) => Parametric (Tangent (Segment Closed v n)) Source # 
Instance details

Defined in Diagrams.Tangent

ToPath (Located [Segment Closed v n]) Source # 
Instance details

Defined in Diagrams.Path

Methods

toPath :: Located [Segment Closed v n] -> Path (V (Located [Segment Closed v n])) (N (Located [Segment Closed v n])) Source #

ToPath (Located (Segment Closed v n)) Source # 
Instance details

Defined in Diagrams.Path

Methods

toPath :: Located (Segment Closed v n) -> Path (V (Located (Segment Closed v n))) (N (Located (Segment Closed v n))) Source #

Functor v => Functor (Segment c v) Source # 
Instance details

Defined in Diagrams.Segment

Methods

fmap :: (a -> b) -> Segment c v a -> Segment c v b #

(<$) :: a -> Segment c v b -> Segment c v a #

(Metric v, OrderedField n, Metric u, OrderedField n') => Cons (SegTree v n) (SegTree u n') (Segment Closed v n) (Segment Closed u n') Source # 
Instance details

Defined in Diagrams.Trail

Methods

_Cons :: Prism (SegTree v n) (SegTree u n') (Segment Closed v n, SegTree v n) (Segment Closed u n', SegTree u n') #

(Metric v, OrderedField n, Metric u, OrderedField n') => Snoc (SegTree v n) (SegTree u n') (Segment Closed v n) (Segment Closed u n') Source # 
Instance details

Defined in Diagrams.Trail

Methods

_Snoc :: Prism (SegTree v n) (SegTree u n') (SegTree v n, Segment Closed v n) (SegTree u n', Segment Closed u n') #

(OrderedField n, Metric v) => Measured (SegMeasure v n) (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

measure :: Segment Closed v n -> SegMeasure v n #

Eq (v n) => Eq (Segment c v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

(==) :: Segment c v n -> Segment c v n -> Bool #

(/=) :: Segment c v n -> Segment c v n -> Bool #

Ord (v n) => Ord (Segment c v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

compare :: Segment c v n -> Segment c v n -> Ordering #

(<) :: Segment c v n -> Segment c v n -> Bool #

(<=) :: Segment c v n -> Segment c v n -> Bool #

(>) :: Segment c v n -> Segment c v n -> Bool #

(>=) :: Segment c v n -> Segment c v n -> Bool #

max :: Segment c v n -> Segment c v n -> Segment c v n #

min :: Segment c v n -> Segment c v n -> Segment c v n #

Show (v n) => Show (Segment c v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

showsPrec :: Int -> Segment c v n -> ShowS #

show :: Segment c v n -> String #

showList :: [Segment c v n] -> ShowS #

Serialize (v n) => Serialize (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

put :: Putter (Segment Closed v n) #

get :: Get (Segment Closed v n) #

Serialize (v n) => Serialize (Segment Open v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

put :: Putter (Segment Open v n) #

get :: Get (Segment Open v n) #

(Metric v, OrderedField n) => Enveloped (Segment Closed v n) Source #

The envelope for a segment is based at the segment's start.

Instance details

Defined in Diagrams.Segment

Methods

getEnvelope :: Segment Closed v n -> Envelope (V (Segment Closed v n)) (N (Segment Closed v n)) #

OrderedField n => Traced (Segment Closed V2 n) Source # 
Instance details

Defined in Diagrams.TwoD.Segment

Transformable (Segment c v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

transform :: Transformation (V (Segment c v n)) (N (Segment c v n)) -> Segment c v n -> Segment c v n #

(Additive v, Num n) => Reversing (Segment Closed v n) Source #

Reverse the direction of a segment.

Instance details

Defined in Diagrams.Segment

Methods

reversing :: Segment Closed v n -> Segment Closed v n #

(Metric v, OrderedField n) => HasArcLength (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

(Additive v, Fractional n) => Sectionable (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

(Additive v, Num n) => EndValues (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

Num n => DomainBounds (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

(Additive v, Num n) => Parametric (Segment Closed v n) Source #

atParam yields a parametrized view of segments as continuous functions [0,1] -> v, which give the offset from the start of the segment for each value of the parameter between 0 and 1. It is designed to be used infix, like seg `atParam` 0.5.

Instance details

Defined in Diagrams.Segment

Methods

atParam :: Segment Closed v n -> N (Segment Closed v n) -> Codomain (Segment Closed v n) (N (Segment Closed v n)) Source #

Renderable (Segment c v n) NullBackend Source # 
Instance details

Defined in Diagrams.Segment

Methods

render :: NullBackend -> Segment c v n -> Render NullBackend (V (Segment c v n)) (N (Segment c v n)) #

r ~ Segment c u n => AffineMappable (Segment c v n) r Source # 
Instance details

Defined in Diagrams.LinearMap

Methods

amap :: AffineMap (V (Segment c v n)) (V r) (N r) -> Segment c v n -> r Source #

r ~ Segment c u m => LinearMappable (Segment c v n) r Source # 
Instance details

Defined in Diagrams.LinearMap

Methods

vmap :: (Vn (Segment c v n) -> Vn r) -> Segment c v n -> r Source #

Each (Segment c v n) (Segment c v' n') (v n) (v' n') Source # 
Instance details

Defined in Diagrams.Segment

Methods

each :: Traversal (Segment c v n) (Segment c v' n') (v n) (v' n') #

(Metric v, OrderedField n, Metric u, OrderedField n') => Cons (Trail' Line v n) (Trail' Line u n') (Segment Closed v n) (Segment Closed u n') Source # 
Instance details

Defined in Diagrams.Trail

Methods

_Cons :: Prism (Trail' Line v n) (Trail' Line u n') (Segment Closed v n, Trail' Line v n) (Segment Closed u n', Trail' Line u n') #

(Metric v, OrderedField n, Metric u, OrderedField n') => Snoc (Trail' Line v n) (Trail' Line u n') (Segment Closed v n) (Segment Closed u n') Source # 
Instance details

Defined in Diagrams.Trail

Methods

_Snoc :: Prism (Trail' Line v n) (Trail' Line u n') (Trail' Line v n, Segment Closed v n) (Trail' Line u n', Segment Closed u n') #

type V (Segment c v n) Source # 
Instance details

Defined in Diagrams.Segment

type V (Segment c v n) = v
type N (Segment c v n) Source # 
Instance details

Defined in Diagrams.Segment

type N (Segment c v n) = n
type Codomain (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

type Codomain (Segment Closed v n) = v

straight :: v n -> Segment Closed v n Source #

straight v constructs a translationally invariant linear segment with direction and length given by the vector v.

bezier3 :: v n -> v n -> v n -> Segment Closed v n Source #

bezier3 c1 c2 x constructs a translationally invariant cubic Bézier curve where the offsets from the first endpoint to the first and second control point and endpoint are respectively given by c1, c2, and x.

bézier3 :: v n -> v n -> v n -> Segment Closed v n Source #

bézier3 is the same as bezier3, but with more snobbery.

reverseSegment :: (Num n, Additive v) => Segment Closed v n -> Segment Closed v n Source #

Reverse the direction of a segment.

mapSegmentVectors :: (v n -> v' n') -> Segment c v n -> Segment c v' n' Source #

Map over the vectors of each segment.

openLinear :: Segment Open v n Source #

An open linear segment. This means the trail makes a straight line from the last segment the beginning to form a loop.

openCubic :: v n -> v n -> Segment Open v n Source #

An open cubic segment. This means the trail makes a cubic bézier with control vectors v1 and v2 to form a loop.

Fixed (absolutely located) segments

data FixedSegment v n Source #

FixedSegments are like Segments except that they have absolute locations. FixedSegment v is isomorphic to Located (Segment Closed v), as witnessed by mkFixedSeg and fromFixedSeg, but FixedSegment is convenient when one needs the absolute locations of the vertices and control points.

Constructors

FLinear (Point v n) (Point v n) 
FCubic (Point v n) (Point v n) (Point v n) (Point v n) 
Instances
(Additive v, Num n) => EndValues (Tangent (FixedSegment v n)) Source # 
Instance details

Defined in Diagrams.Tangent

(Additive v, Num n) => Parametric (Tangent (FixedSegment v n)) Source # 
Instance details

Defined in Diagrams.Tangent

Eq (v n) => Eq (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

(==) :: FixedSegment v n -> FixedSegment v n -> Bool #

(/=) :: FixedSegment v n -> FixedSegment v n -> Bool #

Ord (v n) => Ord (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

Show (v n) => Show (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

(Metric v, OrderedField n) => Enveloped (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

getEnvelope :: FixedSegment v n -> Envelope (V (FixedSegment v n)) (N (FixedSegment v n)) #

OrderedField n => Traced (FixedSegment V2 n) Source # 
Instance details

Defined in Diagrams.TwoD.Segment

(Additive v, Num n) => Transformable (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

(Additive v, Num n) => HasOrigin (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

moveOriginTo :: Point (V (FixedSegment v n)) (N (FixedSegment v n)) -> FixedSegment v n -> FixedSegment v n #

Reversing (FixedSegment v n) Source #

Reverses the control points.

Instance details

Defined in Diagrams.Segment

Methods

reversing :: FixedSegment v n -> FixedSegment v n #

(Metric v, OrderedField n) => HasArcLength (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

(Additive v, Fractional n) => Sectionable (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

(Additive v, Num n) => EndValues (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

Num n => DomainBounds (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

(Additive v, Num n) => Parametric (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

atParam :: FixedSegment v n -> N (FixedSegment v n) -> Codomain (FixedSegment v n) (N (FixedSegment v n)) Source #

ToPath (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Path

Methods

toPath :: FixedSegment v n -> Path (V (FixedSegment v n)) (N (FixedSegment v n)) Source #

r ~ FixedSegment u n => AffineMappable (FixedSegment v n) r Source # 
Instance details

Defined in Diagrams.LinearMap

Methods

amap :: AffineMap (V (FixedSegment v n)) (V r) (N r) -> FixedSegment v n -> r Source #

r ~ FixedSegment u m => LinearMappable (FixedSegment v n) r Source # 
Instance details

Defined in Diagrams.LinearMap

Methods

vmap :: (Vn (FixedSegment v n) -> Vn r) -> FixedSegment v n -> r Source #

Each (FixedSegment v n) (FixedSegment v' n') (Point v n) (Point v' n') Source # 
Instance details

Defined in Diagrams.Segment

Methods

each :: Traversal (FixedSegment v n) (FixedSegment v' n') (Point v n) (Point v' n') #

type V (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

type V (FixedSegment v n) = v
type N (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

type N (FixedSegment v n) = n
type Codomain (FixedSegment v n) Source # 
Instance details

Defined in Diagrams.Segment

type Codomain (FixedSegment v n) = Point v

mkFixedSeg :: (Num n, Additive v) => Located (Segment Closed v n) -> FixedSegment v n Source #

Create a FixedSegment from a located Segment.

fromFixedSeg :: (Num n, Additive v) => FixedSegment v n -> Located (Segment Closed v n) Source #

Convert a FixedSegment back into a located Segment.

fixedSegIso :: (Num n, Additive v) => Iso' (FixedSegment v n) (Located (Segment Closed v n)) Source #

Use a FixedSegment to make an Iso between an a fixed segment and a located segment.

Segment measures

Trails store a sequence of segments in a fingertree, which can automatically track various monoidal "measures" on segments.

newtype SegCount Source #

A type to track the count of segments in a Trail.

Constructors

SegCount (Sum Int) 
Instances
Semigroup SegCount Source # 
Instance details

Defined in Diagrams.Segment

Monoid SegCount Source # 
Instance details

Defined in Diagrams.Segment

Wrapped SegCount Source # 
Instance details

Defined in Diagrams.Segment

Associated Types

type Unwrapped SegCount :: Type #

Rewrapped SegCount SegCount Source # 
Instance details

Defined in Diagrams.Segment

(Metric v, OrderedField n) => Measured (SegMeasure v n) (SegMeasure v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

measure :: SegMeasure v n -> SegMeasure v n #

(Floating n, Ord n, Metric v) => Measured (SegMeasure v n) (SegTree v n) Source # 
Instance details

Defined in Diagrams.Trail

Methods

measure :: SegTree v n -> SegMeasure v n #

(OrderedField n, Metric v) => Measured (SegMeasure v n) (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

measure :: Segment Closed v n -> SegMeasure v n #

type Unwrapped SegCount Source # 
Instance details

Defined in Diagrams.Segment

newtype ArcLength n Source #

A type to represent the total arc length of a chain of segments. The first component is a "standard" arc length, computed to within a tolerance of 10e-6. The second component is a generic arc length function taking the tolerance as an argument.

Constructors

ArcLength (Sum (Interval n), n -> Sum (Interval n)) 
Instances
(Num n, Ord n) => Semigroup (ArcLength n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

(<>) :: ArcLength n -> ArcLength n -> ArcLength n #

sconcat :: NonEmpty (ArcLength n) -> ArcLength n #

stimes :: Integral b => b -> ArcLength n -> ArcLength n #

(Num n, Ord n) => Monoid (ArcLength n) Source # 
Instance details

Defined in Diagrams.Segment

Wrapped (ArcLength n) Source # 
Instance details

Defined in Diagrams.Segment

Associated Types

type Unwrapped (ArcLength n) :: Type #

Rewrapped (ArcLength n) (ArcLength n') Source # 
Instance details

Defined in Diagrams.Segment

(Metric v, OrderedField n) => Measured (SegMeasure v n) (SegMeasure v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

measure :: SegMeasure v n -> SegMeasure v n #

(Floating n, Ord n, Metric v) => Measured (SegMeasure v n) (SegTree v n) Source # 
Instance details

Defined in Diagrams.Trail

Methods

measure :: SegTree v n -> SegMeasure v n #

(OrderedField n, Metric v) => Measured (SegMeasure v n) (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

measure :: Segment Closed v n -> SegMeasure v n #

type Unwrapped (ArcLength n) Source # 
Instance details

Defined in Diagrams.Segment

type Unwrapped (ArcLength n) = (Sum (Interval n), n -> Sum (Interval n))

getArcLengthCached :: ArcLength n -> Interval n Source #

Project out the cached arc length, stored together with error bounds.

getArcLengthFun :: ArcLength n -> n -> Interval n Source #

Project out the generic arc length function taking the tolerance as an argument.

getArcLengthBounded :: (Num n, Ord n) => n -> ArcLength n -> Interval n Source #

Given a specified tolerance, project out the cached arc length if it is accurate enough; otherwise call the generic arc length function with the given tolerance.

newtype TotalOffset v n Source #

A type to represent the total cumulative offset of a chain of segments.

Constructors

TotalOffset (v n) 
Instances
(Num n, Additive v) => Semigroup (TotalOffset v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

(<>) :: TotalOffset v n -> TotalOffset v n -> TotalOffset v n #

sconcat :: NonEmpty (TotalOffset v n) -> TotalOffset v n #

stimes :: Integral b => b -> TotalOffset v n -> TotalOffset v n #

(Num n, Additive v) => Monoid (TotalOffset v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

mempty :: TotalOffset v n #

mappend :: TotalOffset v n -> TotalOffset v n -> TotalOffset v n #

mconcat :: [TotalOffset v n] -> TotalOffset v n #

Wrapped (TotalOffset v n) Source # 
Instance details

Defined in Diagrams.Segment

Associated Types

type Unwrapped (TotalOffset v n) :: Type #

Rewrapped (TotalOffset v n) (TotalOffset v' n') Source # 
Instance details

Defined in Diagrams.Segment

type Unwrapped (TotalOffset v n) Source # 
Instance details

Defined in Diagrams.Segment

type Unwrapped (TotalOffset v n) = v n

data OffsetEnvelope v n Source #

A type to represent the offset and envelope of a chain of segments. They have to be paired into one data structure, since combining the envelopes of two consecutive chains needs to take the offset of the first into account.

Constructors

OffsetEnvelope 

Fields

Instances
(Metric v, OrderedField n) => Semigroup (OffsetEnvelope v n) Source # 
Instance details

Defined in Diagrams.Segment

(Metric v, OrderedField n) => Measured (SegMeasure v n) (SegMeasure v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

measure :: SegMeasure v n -> SegMeasure v n #

(Floating n, Ord n, Metric v) => Measured (SegMeasure v n) (SegTree v n) Source # 
Instance details

Defined in Diagrams.Trail

Methods

measure :: SegTree v n -> SegMeasure v n #

(OrderedField n, Metric v) => Measured (SegMeasure v n) (Segment Closed v n) Source # 
Instance details

Defined in Diagrams.Segment

Methods

measure :: Segment Closed v n -> SegMeasure v n #

oeOffset :: forall v n. Lens' (OffsetEnvelope v n) (TotalOffset v n) Source #

oeEnvelope :: forall v n. Lens' (OffsetEnvelope v n) (Envelope v n) Source #

type SegMeasure v n = SegCount ::: (ArcLength n ::: (OffsetEnvelope v n ::: ())) Source #

SegMeasure collects up all the measurements over a chain of segments.