3D rotations made easy in Julia
This package implements various 3D rotation parameterizations and defines conversions between them. At their heart, each rotation parameterization is a 3×3 unitary (orthogonal) matrix (based on the StaticArrays.jl package), and acts to rotate a 3-vector about the origin through matrix-vector multiplication.
While the RotMatrix
type is a dense representation of a 3×3
matrix, we also
have sparse (or computed, rather) representations such as quaternions,
angle-axis parameterizations, and Euler angles.
For composing rotations about the origin with other transformations, see the CoordinateTransformations.jl package.
The following operations are supported by all of the implemented rotation parameterizations.
Any two rotations of the same type can be composed with simple multiplication:
q3 = q2*q1
Rotations can be composed with the opposite (or inverse) rotation with the appropriate division operation
q1 = q2\q3
q2 = q3/q1
Any rotation can operate on a 3D vector (represented as a SVector{3}
), again through
simple multiplication:
r2 = q*r
which also supports multiplication by the opposite rotation
r = q\r2
The rotation angle and axis can be obtained for any rotation parameterization using
rotation_axis(r::Rotation)
rotation_angle(r::Rotation)
All rotation types support one(R)
to construct the identity rotation for the desired parameterization. A random rotation, uniformly sampled over the space of rotations, can be sampled using rand(R)
. For example:
r = one(QuatRotation) # equivalent to QuatRotation(1.0, 0.0, 0.0, 0.0)
q = rand(QuatRotation)
p = rand(MRP{Float32})
All rotatations can be converted to another parameterization by simply calling the constructor for the desired parameterization. For example:
q = rand(QuatRotation)
aa = AngleAxis(q)
r = RotMatrix(aa)
using Rotations, StaticArrays
# create the identity rotation (identity matrix)
id = one(RotMatrix{3, Float64})
# create a random rotation matrix (uniformly distributed over all 3D rotations)
r = rand(RotMatrix{3}) # uses Float64 by default
# create a point
p = SVector(1.0, 2.0, 3.0) # from StaticArrays.jl, but could use any AbstractVector...
# convert to a quaternion (QuatRotation) and rotate the point
q = QuatRotation(r)
p_rotated = q * p
# Compose rotations
q2 = rand(QuatRotation)
q3 = q * q2
# Take the inverse (equivalent to transpose)
q_inv = transpose(q)
q_inv == inv(q)
p ≈ q_inv * (q * p)
q4 = q3 / q2 # q4 = q3 * inv(q2)
q5 = q3 \ q2 # q5 = inv(q3) * q2
# convert to a Modified Rodrigues Parameter (aka Stereographic quaternion projection, recommended for applications with differentiation)
spq = MRP(r)
# convert to the Angle-axis parameterization, or related Rotation vector
aa = AngleAxis(r)
rv = RotationVec(r)
ϕ = rotation_angle(r)
v = rotation_axis(r)
# convert to Euler angles, composed of X/Y/Z axis rotations (Z applied first)
# (all combinations of "RotABC" are defined)
r_xyz = RotXYZ(r)
# Rotation about the X axis by 0.1 radians
r_x = RotX(0.1)
# Composing axis rotations together automatically results in Euler parameterization
RotX(0.1) * RotY(0.2) * RotZ(0.3) === RotXYZ(0.1, 0.2, 0.3)
# Can calculate Jacobian - derivatives of rotations with respect to parameters
j1 = Rotations.jacobian(RotMatrix, q) # How does the matrix change w.r.t the 4 Quat parameters?
j2 = Rotations.jacobian(q, p) # How does the rotated point q*p change w.r.t. the 4 Quat parameters?
# ... all Jacobian's involving RotMatrix, MRP and Quat are implemented
# (MRP is ideal for optimization purposes - no constaints/singularities)
-
Rotation Matrix
RotMatrix{N, T}
An N×N rotation matrix storing the rotation. This is a simple wrapper for a StaticArrays
SMatrix{N,N,T}
. A rotation matrixR
should have the propertyI = R * R'
, but this isn't enforced by the constructor. On the other hand, all the types below are guaranteed to be "proper" rotations for all input parameters (equivalently: parity conserving, in SO(3),det(r) = 1
, or a rotation without reflection). -
Arbitrary Axis Rotation
AngleAxis{T}
A 3D rotation with fields
theta
,axis_x
,axis_y
, andaxis_z
to store the rotation angle and axis of the rotation. Like all other types in this package, once it is constructed it acts and behaves as a 3×3AbstractMatrix
. The axis will be automatically renormalized by the constructor to be a unit vector, so thattheta
always represents the rotation angle in radians. -
Quaternions
QuatRotation{T}
A 3D rotation parameterized by a unit quaternion. Note that the constructor will renormalize the quaternion to be a unit quaternion, and that although they follow the same multiplicative algebra as quaternions, it is better to think of
QuatRotation
as a 3×3 matrix rather than as a quaternion number.Previously
Quat
,UnitQuaternion
. -
Rotation Vector
RotationVec{T}
A 3D rotation encoded by an angle-axis representation as
angle * axis
. This type is used in packages such as OpenCV.Note: If you're differentiating a Rodrigues Vector check the result is what you expect at theta = 0. The first derivative of the rotation should behave, but higher-order derivatives of it (as well as parameterization conversions) should be tested. The Stereographic Quaternion Projection (
MRP
) is the recommended three parameter format for differentiation.Previously
RodriguesVec
. -
Rodrigues Parameters
RodriguesParam{T}
A 3-parameter representation of 3D rotations that has a singularity at 180 degrees. They can be interpreted as a projection of the unit quaternion onto the plane tangent to the quaternion identity. They are computationally efficient and do not have a sign ambiguity. -
Modified Rodrigues Parameter
MRP{T}
A 3D rotation encoded by the stereographic projection of a unit quaternion. This projection can be visualized as a pin hole camera, with the pin hole matching the quaternion[-1,0,0,0]
and the image plane containing the origin and having normal direction[1,0,0,0]
. The "identity rotation"Quaternion(1.0,0,0,0)
then maps to theMRP(0,0,0)
These are similar to the Rodrigues vector in that the axis direction is stored in an unnormalized form, and the rotation angle is encoded in the length of the axis. This type has the nice property that the derivatives of the rotation matrix w.r.t. the
MRP
parameters are rational functions, making theMRP
type a good choice for differentiation / optimization.They are frequently used in aerospace applications since they are a 3-parameter representation whose singularity happens at 360 degrees. In practice, the singularity can be avoided with some switching logic between one of two equivalent MRPs (obtained by projecting the negated quaternion).
Previously
SPQuat
. -
Cardinal axis rotations
RotX{T}
,RotY{T}
,RotZ{T}
Sparse representations of 3D rotations about the X, Y, or Z axis, respectively.
-
Two-axis rotations
RotXY{T}
, etcConceptually, these are compositions of two of the cardinal axis rotations above, so that
RotXY(x, y) == RotX(x) * RotY(y)
(note that the order of application to a vector is right-to-left, as-in matrix-matrix-vector multiplication:RotXY(x, y) * v == RotX(x) * (RotY(y) * v)
). -
Euler Angles - Three-axis rotations
RotXYZ{T}
,RotXYX{T}
, etcA composition of 3 cardinal axis rotations is typically known as a Euler angle parameterization of a 3D rotation. The rotations with 3 unique axes, such as
RotXYZ
, are said to follow the Tait Bryan angle ordering, while those which repeat (e.g.EulerXYX
) are said to use Proper Euler angle ordering.Like the two-angle versions, the order of application to a vector is right-to-left, so that
RotXYZ(x, y, z) * v == RotX(x) * (RotY(y) * (RotZ(z) * v))
. This may be interpreted as an "extrinsic" rotation about the Z, Y, and X axes or as an "intrinsic" rotation about the X, Y, and Z axes. Similarly,RotZYX(z, y, x)
may be interpreted as an "extrinsic" rotation about the X, Y, and Z axes or an "intrinsic" rotation about the Z, Y, and X axes.
It is often convenient to consider perturbations or errors about a particular 3D rotation, such as applications in state estimation or optimization-based control. Intuitively, we expect these errors to live in three-dimensional space. For globally non-singular parameterizations such as unit quaternions, we need a way to map between the four parameters of the quaternion to this three-dimensional plane tangent to the four-dimensional hypersphere on which quaternions live.
There are several of these maps provided by Rotations.jl:
-
ExponentialMap
: A very common mapping that uses the quaternion exponential and the quaternion logarithm. The quaternion logarithm converts a 3D rotation vector (i.e. axis-angle vector) to a unit quaternion. It tends to be the most computationally expensive mapping. -
CayleyMap
: Represents the differential quaternion using Rodrigues parameters. This parameterization goes singular at 180° but does not inherit the sign ambiguities of the unit quaternion. It offers an excellent combination of cheap computation and good behavior. -
MRPMap
: Uses Modified Rodrigues Parameters (MRPs) to represent the differential unit quaternion. This mapping goes singular at 360°. -
QuatVecMap
: Uses the vector part of the unit quaternion as the differential unit quaternion. This mapping also goes singular at 180° but is the computationally cheapest map and often performs well.
Rotations.jl provides the RotationError
type for representing rotation errors, that act just like a SVector{3}
but carry the nonlinear map used to compute the error, which can also be used to convert the error back to a QuatRotation
(and, by extention, any other 3D rotation parameterization). The following methods are useful for computing RotationError
s and adding them back to the nominal rotation:
rotation_error(R1::Rotation, R2::Rotation, error_map::ErrorMap) # compute the error between `R1` and `R2` using `error_map`
add_error(R::Rotation, err::RotationError) # "adds" the error to `R` by converting back a `UnitQuaterion` and composing with `R`
or their aliases
R1 ⊖ R2 # caclulate the error using the default error map
R1 ⊕ err # alias for `add_error(R1, err)`
For a practical application of these ideas, see the quatenrion-multiplicative Extended Kalman Filter (MEKF). This article provides a good description.
When taking derivatives with respect to quaternions we need to account both for these mappings and the fact that local perturbations to a rotation act through composition instead of addition, as they do in vector space (e.g. q * dq
vs x + dx
). The following methods are useful for computing these Jacobians for QuatRotation
, RodriguesParam
or MRP
∇rotate(q,r)
: Jacobian of theq*r
with respect to the rotation∇composition1(q2,q1)
: Jacobian ofq2*q1
with respect to q1∇composition2(q2,q1,b)
: Jacobian ofq2*q1
with respect to q2∇²composition1(q2,q1)
: Jacobian of∇composition1(q2,q2)'b
where b is an arbitrary vector∇differential(q)
: Jacobian of composing the rotation with an infinitesimal rotation, with respect to the infinitesimal rotation. For unit quaternions, this is a 4x3 matrix.∇²differential(q,b)
: Jacobian of∇differential(q)'b
for some vector b.
All parameterizations can be converted to and from (mutable or immutable) 3×3 matrices, e.g.
using StaticArrays, Rotations
# export
q = QuatRotation(1.0,0,0,0)
matrix_mutable = Array(q)
matrix_immutable = SMatrix{3,3}(q)
# import
q2 = Quaternion(matrix_mutable)
q3 = Quaternion(matrix_immutable)
This package assumes active (right handed) rotations where applicable.
They're faster (Julia's Array
and BLAS aren't great for 3×3 matrices) and
don't need preallocating or garbage collection. For example, see this benchmark
case where we get a 20× speedup:
julia> cd(Pkg.dir("Rotations") * "/test")
julia> include("benchmark.jl")
julia > BenchMarkRotations.benchmark_mutable()
Rotating using mutables (Base.Matrix and Base.Vector):
0.124035 seconds (2 allocations: 224 bytes)
Rotating using immutables (Rotations.RotMatrix and StaticArrays.SVector):
0.006006 seconds