Difference between revisions of "Oolite JavaScript Reference: Quaternion"

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Additionally, a rotation quaternion must be normalized; that is, it must fulfill the '''normal invariant''' ''Q<sub>w</sub>''² + ''Q<sub>x</sub>''² + ''Q<sub>y</sub>''² + ''Q<sub>z</sub>''² = 1. Unlike with [[property list]] scripting and specifications, quaternions will not be automatically normalized for you except where specified, but a <code>[[#normalize|normalize]]()</code> method is provided.
 
Additionally, a rotation quaternion must be normalized; that is, it must fulfill the '''normal invariant''' ''Q<sub>w</sub>''² + ''Q<sub>x</sub>''² + ''Q<sub>y</sub>''² + ''Q<sub>z</sub>''² = 1. Unlike with [[property list]] scripting and specifications, quaternions will not be automatically normalized for you except where specified, but a <code>[[#normalize|normalize]]()</code> method is provided.
  
An '''identity rotation''' – that is, one which, when applied, has no effect – is represented by the '''identity quaternion''' (1, 0, 0, 0).
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An '''identity rotation''' – that is, one which, when applied, has no effect – is represented by the '''identity quaternion''' (1, 0, 0, 0). Often you will want to start with this identity quaternion before applying the methods '''rotate''', '''rotateX''', '''rotateY''' or '''rotateZ'''.
  
 
The <code>Quaternion</code> class provides several methods to make construction of rotations easier: <code>[[#rotate|rotate]]()</code>, <code>[[#rotateX|rotateX]]()</code>, <code>[[#rotateY|rotateY]]()</code>, <code>[[#rotateZ|rotateZ]]()</code>.
 
The <code>Quaternion</code> class provides several methods to make construction of rotations easier: <code>[[#rotate|rotate]]()</code>, <code>[[#rotateX|rotateX]]()</code>, <code>[[#rotateY|rotateY]]()</code>, <code>[[#rotateZ|rotateZ]]()</code>.
  
 
Rotations can be combined by quaternion multiplication (see the <code>[[#multiply|multiply]]()</code> method). Note that quaternion multiplication is not commutative; that is, ''PQ'' is not the same as ''QP''. If this seems strange, take a box or book and assign it ''x'', ''y'' and ''z'' axes. Rotate it about the ''x'' axis and then the ''y'' axis. Then, rotate it about the ''y'' axis followed by the ''x'' axis. If the results of the two rotations are the same, you’re doing it wrong.
 
Rotations can be combined by quaternion multiplication (see the <code>[[#multiply|multiply]]()</code> method). Note that quaternion multiplication is not commutative; that is, ''PQ'' is not the same as ''QP''. If this seems strange, take a box or book and assign it ''x'', ''y'' and ''z'' axes. Rotate it about the ''x'' axis and then the ''y'' axis. Then, rotate it about the ''y'' axis followed by the ''x'' axis. If the results of the two rotations are the same, you’re doing it wrong.
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The [https://app.box.com/s/6usw7ozbvobze3hkouzc Quaternion calculator] is a very useful spreadsheet to get quaternions from rotation angles.
  
 
=== Quaternion Expressions ===
 
=== Quaternion Expressions ===
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=== Constructor ===
 
=== Constructor ===
 
  '''new Quaternion'''([value : [[#Quaternion Expressions|quaternionExpression]]])
 
  '''new Quaternion'''([value : [[#Quaternion Expressions|quaternionExpression]]])
Create a new quaternion with the specified value. If no value is provided, the vector is initialized to the identity quaternion (1, 0, 0, 0).
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Create a new quaternion with the specified value. If no value is provided, the quaternion is initialized to the identity quaternion (1, 0, 0, 0).
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''Note'': in version 1.77 or earlier, the quaternion is incorrectly initialised to the zero quaternion ('''0''', 0, 0, 0) if no value is provided. For portability you should therefore provide a value to the constructor.
  
 
=== <code>conjugate</code> ===
 
=== <code>conjugate</code> ===
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=== <code>rotate</code> ===
 
=== <code>rotate</code> ===
 
  function '''rotate'''(a : [[Oolite JavaScript Reference: Vector#Vector Expressions|vectorExpression]], angle : Number) : Quaternion
 
  function '''rotate'''(a : [[Oolite JavaScript Reference: Vector#Vector Expressions|vectorExpression]], angle : Number) : Quaternion
Returns a quaternion rotated <code>angle</code> radians about the axis of <code>a</code>. The vector <code>a</code> must be a normalized vector. (FIXME: clockwise or anticlockwise?)
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Returns a quaternion rotated <code>angle</code> radians about the axis of <code>a</code>. The vector <code>a</code> must be a normalized vector. A positive angle is anti-clockwise if the vector is pointing towards you.
  
 
=== <code>rotateX</code> ===
 
=== <code>rotateX</code> ===
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=== <code>rotateY</code> ===
 
=== <code>rotateY</code> ===
 
  function '''rotateY'''(angle : Number) : Quaternion
 
  function '''rotateY'''(angle : Number) : Quaternion
Returns a quaternion rotated <code>angle</code> radians about the ''y'' axis. (FIXME: clockwise or anticlockwise?)
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Returns a quaternion rotated <code>angle</code> radians about the ''y'' axis. A positive angle is anti-clockwise if the ''y'' axis is pointing towards you.
  
 
<code>q.rotateY(angle)</code> is equivalent to <code>q.[[#rotate|rotate]]([0, 1, 0], angle)</code>.
 
<code>q.rotateY(angle)</code> is equivalent to <code>q.[[#rotate|rotate]]([0, 1, 0], angle)</code>.
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=== <code>rotateZ</code> ===
 
=== <code>rotateZ</code> ===
 
  function '''rotateZ'''(angle : Number) : Quaternion
 
  function '''rotateZ'''(angle : Number) : Quaternion
Returns a quaternion rotated <code>angle</code> radians about the ''z'' axis. (FIXME: clockwise or anticlockwise?)
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Returns a quaternion rotated <code>angle</code> radians about the ''z'' axis. A positive angle is anti-clockwise if the ''z'' axis is pointing towards you.
  
 
<code>q.rotateZ(angle)</code> is equivalent to <code>q.[[#rotate|rotate]]([0, 0, 1], angle)</code>.
 
<code>q.rotateZ(angle)</code> is equivalent to <code>q.[[#rotate|rotate]]([0, 0, 1], angle)</code>.

Latest revision as of 10:05, 20 June 2014

Prototype: Object
Subtypes: none

The Quaternion class represents a quaternion, a four-dimensional number, which is used to express rotations. Explaining quaternion mathematics is way beyond the scope of this document, but a quick overview is provided below.

Quaternions for Rotations

This is a very quick, pragmatic discussion of quaternions as they apply to rotating things in Oolite. If you’re interested in the theory, see:

Consider a ship at point h oriented to face a station at point t. This can be expressed as the vector from the ship to the station, v = th. However, if the ship rolls, it is still heading along the same vector v, so additional information is required: a twist angle, α. A rotation quaternion is a tuple Q = (w, x, y, z), such that

Qw = cos α/2
Qx = vx sin α/2
Qy = vy sin α/2
Qz = vz sin α/2

Additionally, a rotation quaternion must be normalized; that is, it must fulfill the normal invariant Qw² + Qx² + Qy² + Qz² = 1. Unlike with property list scripting and specifications, quaternions will not be automatically normalized for you except where specified, but a normalize() method is provided.

An identity rotation – that is, one which, when applied, has no effect – is represented by the identity quaternion (1, 0, 0, 0). Often you will want to start with this identity quaternion before applying the methods rotate, rotateX, rotateY or rotateZ.

The Quaternion class provides several methods to make construction of rotations easier: rotate(), rotateX(), rotateY(), rotateZ().

Rotations can be combined by quaternion multiplication (see the multiply() method). Note that quaternion multiplication is not commutative; that is, PQ is not the same as QP. If this seems strange, take a box or book and assign it x, y and z axes. Rotate it about the x axis and then the y axis. Then, rotate it about the y axis followed by the x axis. If the results of the two rotations are the same, you’re doing it wrong.

The Quaternion calculator is a very useful spreadsheet to get quaternions from rotation angles.

Quaternion Expressions

All Oolite-provided functions which take a quaternion as an argument may instead be passed an array of four numbers, or an Entity (in which case the entity’s orientation is used). In specifications, this is represented by arguments typed quaternionExpression.

Properties

w

w : Number (read/write)

The w component of the quaternion.

x

x : Number (read/write)

The x component of the quaternion.

y

y : Number (read/write)

The y component of the quaternion.

z

z : Number (read/write)

The z component of the quaternion.

Methods

Constructor

new Quaternion([value : quaternionExpression])

Create a new quaternion with the specified value. If no value is provided, the quaternion is initialized to the identity quaternion (1, 0, 0, 0).

Note: in version 1.77 or earlier, the quaternion is incorrectly initialised to the zero quaternion (0, 0, 0, 0) if no value is provided. For portability you should therefore provide a value to the constructor.

conjugate

This method was added in Oolite test release 1.77.

function conjugate() : Quaternion

Return the conjugate of the quaternion (i.e. the quaternion which when multiplied by the original quaternion returns the identity quaternion). The input quaternion must be normalized.

dot

function dot(q : quaternionExpression) : Number

Returns the quaternion dot product (inner product) of the target and q. (For two normalized quaternions, this will be 1 if they’re equal, -1 if they’re opposite and 0 if they’re perpendicular.)

multiply

function multiply(q : quaternionExpression) : Quaternion

Returns the standard quaternion product (Grassmann product) of the target and q. This is used to concatenate rotations together.

normalize

function normalize() : Quaternion

Returns the quaternion adjusted to fulfill the normal invariant. Specifically, this divides each component by the square root of (w² + x² + y² + z²).

rotate

function rotate(a : vectorExpression, angle : Number) : Quaternion

Returns a quaternion rotated angle radians about the axis of a. The vector a must be a normalized vector. A positive angle is anti-clockwise if the vector is pointing towards you.

rotateX

function rotateX(angle : Number) : Quaternion

Returns a quaternion rotated angle radians about the x axis. A positive angle is anti-clockwise if the x axis is pointing towards you.

q.rotateX(angle) is equivalent to q.rotate([1, 0, 0], angle).

rotateY

function rotateY(angle : Number) : Quaternion

Returns a quaternion rotated angle radians about the y axis. A positive angle is anti-clockwise if the y axis is pointing towards you.

q.rotateY(angle) is equivalent to q.rotate([0, 1, 0], angle).

rotateZ

function rotateZ(angle : Number) : Quaternion

Returns a quaternion rotated angle radians about the z axis. A positive angle is anti-clockwise if the z axis is pointing towards you.

q.rotateZ(angle) is equivalent to q.rotate([0, 0, 1], angle).

toArray

function toArray() : Array

Returns an array of the quaternion’s components, in the order [w, x, y, z]. q.toArray() is equivalent to [q.w, q.x, q.y, q.z].

vectorForward

function vectorForward() : Vector

Returns the forward vector from the quaternion.

To understand this, consider an entity which is aligned with the world co-ordinate system – that is, its orientation is the identity quaternion (1, 0, 0, 0), and thus its x axis is aligned with the world x axis, its y axis is aligned with the world y axis and its z axis is aligned with the world z axis. If it is rotated by a quaternion Q, Q.vectorForward() is the forward (z) axis after rotation. Similarly, Q.vectorUp() is the up (y) axis after rotation, and Q.vectorRight() is the right (x) axis after rotation.

vectorRight

function vectorRight() : Vector

Returns the right vector from the quaternion. See vectorForward() for a definition.

vectorUp

function vectorUp() : Vector

Returns the up vector from the quaternion. See vectorForward() for a definition.

Static Methods

random

function random() : Quaternion

Returns a random normalized quaternion.