So far we have represented the pose of an object in the plane using a homogeneous transformation, a 3x3 matrix belonging to the special Euclidean group SE(2), which is also a Lie group.
An alternative, and compact, representation of pose is as a twist, a 3-vector comprising the unique elements of the corresponding 3x3 matrix in the Lie algebra se(2). The matrix exponential of the Lie algebra matrix is a Lie group matrix.
Given a homogeneous transformation, return the corresponding twist as a column vector with the translational elements first.
Solution Stats
Problem Comments
Solution Comments
Show commentsProblem Recent Solvers19
Suggested Problems
-
3939 Solvers
-
Test if a Number is a Palindrome without using any String Operations
256 Solvers
-
Sum all integers from 1 to 2^n
17879 Solvers
-
Convert Roman to Arabic Numerals
124 Solvers
-
Volume difference between Ellipsoid and Sphere
136 Solvers
More from this Author16
Problem Tags
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
