More about Coordinate Systems¶
We will now look at how we can initialize new coordinate systems in
sympy.vector, positioned and oriented in user-defined
ways with respect to already-existing systems.
Locating new systems¶
We already know that the origin property of a
CoordSysCartesian corresponds to the Point instance
denoting its origin reference point.
Consider a coordinate system \(N\). Suppose we want to define a new system \(M\), whose origin is located at \(\mathbf{3\hat{i} + 4\hat{j} + 5\hat{k}}\) from \(N\)‘s origin. In other words, the coordinates of \(M\)‘s origin from N’s perspective happen to be \((3, 4, 5)\). Moreover, this would also mean that the coordinates of \(N\)‘s origin with respect to \(M\) would be \((-3, -4, -5)\).
This can be achieved programatically as follows -
>>> from sympy.vector import CoordSysCartesian
>>> N = CoordSysCartesian('N')
>>> M = N.locate_new('M', 3*N.i + 4*N.j + 5*N.k)
>>> M.position_wrt(N)
3*N.i + 4*N.j + 5*N.k
>>> N.origin.express_coordinates(M)
(-3, -4, -5)
It is worth noting that \(M\)‘s orientation is the same as that of
\(N\). This means that the rotation matrix of :math: \(N\) with respect
to \(M\), and also vice versa, is equal to the identity matrix of
dimensions 3x3.
The locate_new method initializes a CoordSysCartesian that
is only translated in space, not re-oriented, relative to the ‘parent’
system.
Orienting new systems¶
Similar to ‘locating’ new systems, sympy.vector also allows for
initialization of new CoordSysCartesian instances that are oriented
in user-defined ways with respect to existing systems.
Suppose you have a coordinate system \(A\).
>>> from sympy.vector import CoordSysCartesian
>>> A = CoordSysCartesian('A')
You want to initialize a new coordinate system \(B\), that is rotated with respect to \(A\)‘s Z-axis by an angle \(\theta\).
>>> from sympy import Symbol
>>> theta = Symbol('theta')
The orientation is shown in the diagram below:
There are two ways to achieve this.
Using a method of CoordSysCartesian directly¶
This is the easiest, cleanest, and hence the recommended way of doing it.
>>> B = A.orient_new_axis('B', theta, A.k)
This initialzes \(B\) with the required orientation information with respect to \(A\).
CoordSysCartesian provides the following direct orientation methods
in its API-
orient_new_axisorient_new_bodyorient_new_spaceorient_new_quaternion
Please look at the CoordSysCartesian class API given in the docs
of this module, to know their functionality and required arguments
in detail.
Using Orienter(s) and the orient_new method¶
You would first have to initialize an AxisOrienter instance for
storing the rotation information.
>>> from sympy.vector import AxisOrienter
>>> axis_orienter = AxisOrienter(theta, A.k)
And then apply it using the orient_new method, to obtain \(B\).
>>> B = A.orient_new('B', axis_orienter)
orient_new also lets you orient new systems using multiple
Orienter instances, provided in an iterable. The rotations/orientations
are applied to the new system in the order the Orienter instances
appear in the iterable.
>>> from sympy.vector import BodyOrienter
>>> from sympy.abc import a, b, c
>>> body_orienter = BodyOrienter(a, b, c, 'XYZ')
>>> C = A.orient_new('C', (axis_orienter, body_orienter))
The sympy.vector API provides the following four Orienter
classes for orientation purposes-
AxisOrienterBodyOrienterSpaceOrienterQuaternionOrienter
Please refer to the API of the respective classes in the docs of this module to know more.
In each of the above examples, the origin of the new coordinate system coincides with the origin of the ‘parent’ system.
>>> B.position_wrt(A)
0
To compute the rotation matrix of any coordinate system with respect
to another one, use the rotation_matrix method.
>>> B = A.orient_new_axis('B', a, A.k)
>>> B.rotation_matrix(A)
Matrix([
[ cos(a), sin(a), 0],
[-sin(a), cos(a), 0],
[ 0, 0, 1]])
>>> B.rotation_matrix(B)
Matrix([
[1, 0, 0],
[0, 1, 0],
[0, 0, 1]])
Orienting AND Locating new systems¶
What if you want to initialize a new system that is not only oriented in a pre-defined way, but also translated with respect to the parent?
Each of the orient_new_<method of orientation> methods, as well
as the orient_new method, support a location keyword
argument.
If a Vector is supplied as the value for this kwarg, the
new system’s origin is automatically defined to be located at that
position vector with respect to the parent coordinate system.
Thus, the orientation methods also act as methods to support orientation+ location of the new systems.
>>> C = A.orient_new_axis('C', a, A.k, location=2*A.j)
>>> C.position_wrt(A)
2*A.j
>>> from sympy.vector import express
>>> express(A.position_wrt(C), C)
(-2*sin(a))*C.i + (-2*cos(a))*C.j
More on the express function in a bit.
Expression of quantities in different coordinate systems¶
Vectors and Dyadics¶
As mentioned earlier, the same vector attains different expressions in different coordinate systems. In general, the same is true for scalar expressions and dyadic tensors.
sympy.vector supports the expression of vector/scalar quantities
in different coordinate systems using the express function.
For purposes of this section, assume the following initializations-
>>> from sympy.vector import CoordSysCartesian, express
>>> from sympy.abc import a, b, c
>>> N = CoordSysCartesian('N')
>>> M = N.orient_new_axis('M', a, N.k)
Vector instances can be expressed in user defined systems using
express.
>>> v1 = N.i + N.j + N.k
>>> express(v1, M)
(sin(a) + cos(a))*M.i + (-sin(a) + cos(a))*M.j + M.k
>>> v2 = N.i + M.j
>>> express(v2, N)
(-sin(a) + 1)*N.i + (cos(a))*N.j
Apart from Vector instances, express also supports
reexpression of scalars (general SymPy Expr) and
Dyadic objects.
express also accepts a second coordinate system
for re-expressing Dyadic instances.
>>> d = 2*(M.i | N.j) + 3* (M.j | N.k)
>>> express(d, M)
(2*sin(a))*(M.i|M.i) + (2*cos(a))*(M.i|M.j) + 3*(M.j|M.k)
>>> express(d, M, N)
2*(M.i|N.j) + 3*(M.j|N.k)
Coordinate Variables¶
The location of a coordinate system’s origin does not affect the
re-expression of BaseVector instances. However, it does affect
the way BaseScalar instances are expressed in different systems.
BaseScalar instances, are coordinate ‘symbols’ meant to denote the
variables used in the definition of vector/scalar fields in
sympy.vector.
For example, consider the scalar field \(\mathbf{{T}_{N}(x, y, z) = x + y + z}\) defined in system \(N\). Thus, at a point with coordinates \((a, b, c)\), the value of the field would be \(a + b + c\). Now consider system \(R\), whose origin is located at \((1, 2, 3)\) with respect to \(N\) (no change of orientation). A point with coordinates \((a, b, c)\) in \(R\) has coordinates \((a + 1, b + 2, c + 3)\) in \(N\). Therefore, the expression for \(\mathbf{{T}_{N}}\) in \(R\) becomes \(\mathbf{{T}_{R}}(x, y, z) = x + y + z + 6\).
Coordinate variables, if present in a vector/scalar/dyadic expression,
can also be re-expressed in a given coordinate system, by setting the
variables keyword argument of express to True.
The above mentioned example, done programatically, would look like this -
>>> R = N.locate_new('R', N.i + 2*N.j + 3*N.k)
>>> T_N = N.x + N.y + N.z
>>> express(T_N, R, variables=True)
R.x + R.y + R.z + 6
Other expression-dependent methods¶
The to_matrix method of Vector and
express_coordinates method of Point also return
different results depending on the coordinate system being provided.
>>> P = R.origin.locate_new('P', a*R.i + b*R.j + c*R.k)
>>> P.express_coordinates(N)
(a + 1, b + 2, c + 3)
>>> P.express_coordinates(R)
(a, b, c)
>>> v = N.i + N.j + N.k
>>> v.to_matrix(M)
Matrix([
[ sin(a) + cos(a)],
[-sin(a) + cos(a)],
[ 1]])
>>> v.to_matrix(N)
Matrix([
[1],
[1],
[1]])
