Model-based Control: Difference between revisions
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Revision as of 18:13, 6 September 2019
The STorM32's model-based gimbal control can take into account, to a certain extend, the moments of inertia of the camera and the roll and yaw arms.
For the underlying theory see Camera Gimbals: A Robotics Approach.
The camera is described by the three main moments of inertia
- I_pitch, I_roll, I_yaw
The roll arm is modeled with the moments of inertia
- I2_roll, I2_yaw
The yaw arm is modeled with the moment of inertia
- I3_yaw
Ideal Camera Design
From the perspective of PID control and axis coupling, the camera should ideally have these properties:
- I_roll \approx I_yaw
- I_pitch << I_roll, I_yaw
Interestingly, a sphere is not ideal, maybe in contrast to common believe.
Moments of Inertia
Estimates for the relative ratios of the moments of inertia of the camera can be obtained by approximating by a cuboid.
For a homogeneous, solid cuboid holds
I = 1/12 M ( a^2 + b^2 )
- https://en.wikipedia.org/wiki/Moment_of_inertia
- https://en.wikipedia.org/wiki/List_of_moments_of_inertia
Camera Panasonic
width | height | length |
---|---|---|
2.5 cm | 5.5 cm | 9 cm |
axis | approximate moment of inertia | relative ratio |
---|---|---|
pitch | I \propto 2.5^2 + 5.5^2 = 36.5 | 1 |
roll | I \propto 5.5^2 + 9^2 = 111.25 | 3.05 |
yaw | I \propto 2.5^2 + 9^2 = 87.25 | 2.39 |
Camera GoPro Hero5
width | height | length |
---|---|---|
2.5 cm | 4.5 cm | 6.3 cm |
axis | approximate moment of inertia | relative ratio |
---|---|---|
pitch | I \propto 2.5^2 + 4.5^2 = 26.5 | 1 |
roll | I \propto 4.5^2 + 6.3^2 = 59.94 | 2.26 |
yaw | I \propto 2.5^2 + 6.3^2 = 45.94 | 1.73 |
Camera Mobius
width | height | length |
---|---|---|
6 cm | 2 cm | 3 cm |
axis | approximate moment of inertia | relative ratio |
---|---|---|
pitch | I \propto 6^2 + 2^2 = 40 | 1 |
roll | I \propto 2^2 + 3^2 = 13 | 0.325 |
yaw | I \propto 6^2 + 3^2 = 45 | 1.125 |
The Mobius camera style is not ideal, and thus more difficult to stabilize.