Utilize sensor data from both LIDAR and RADAR measurements for object (e.g. pedestrian, vehicles, or other moving objects) tracking with the Extended Kalman Filter.
In this demo, the blue car is the object to be tracked, but the tracked object can be any types, e.g. pedestrian, vehicles, or other moving objects. We continuously got both LIDAR (red circle) and RADAR (blue circle) measurements of the car's location in the defined coordinate, but there might be noise and errors in the data. Also, we need to find a way to fuse the two types of sensor measurements to estimate the proper location of the tracked object.
Therefore, we use Extended Kalman Filter to compute the estimated location (green triangle) of the blue car. The estimated trajectory (green triangle) is compared with the ground true trajectory of the blue car, and the error is displayed in RMSE format in real time.
In autonomous driving case, the self-driving cars obtian both Lidar and radar sensors measurements of objects to be tracked, and then apply the Extended Kalman Filter to track the objects based on the two types of sensor data.
- cmake >= 3.5
- All OSes: click here for installation instructions
- make >= 4.1
- Linux: make is installed by default on most Linux distros
- Mac: install Xcode command line tools to get make
- Windows: Click here for installation instructions
- gcc/g++ >= 5.4
- Linux: gcc / g++ is installed by default on most Linux distros
- Mac: same deal as make - [install Xcode command line tools]((https://developer.apple.com/xcode/features/)
- Windows: recommend using MinGW
- Eigen library
(Note: the hyperlinks only works if you are on the homepage of this GitHub reop, and if you are viewing it in "github.io" you can be redirected by clicking the View the Project on GitHub on the top)
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CMakeLists.txt is the cmake file.
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data folder contains test lidar and radar measurements.
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Docs folder contains docments which describe the data.
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src folder contains the source code.
- Clone this repo.
- Make a build directory:
mkdir build && cd build
- Compile:
cmake .. && make
- On windows, you may need to run:
cmake .. -G "Unix Makefiles" && make
- On windows, you may need to run:
- Run it by either of the following commands:
./ExtendedKF ../data/obj_pose-laser-radar-synthetic-input.txt ./output.txt
./ExtendedKF ../data/sample-laser-radar-measurement-data-1.txt ./output.txt
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0.2.1
- Docs: Add a sample video for vehicle tracking
- Date 3 May 2017
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0.2.0
- Fix: Normalize the angle for EKF updates with Radar
- Fix: Initialize several variables
- Date 2 May 2017
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0.1.1
- First proper release
- Date 1 May 2017
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0.1.0
- Initiate the repo and add the functionality of pedestrian trakcing with lidar data.
- Date 28 April 2017
In this demo, both LIDAR and RADAR measurements are used for object tracking.
In this demo, only LIDAR measurements are used for the object tracking.
In this demo, only RADAR measurements are used for the object tracking. are more noisy than the LIDAR measurements.
- RADAR measurements are tend to be more more noisy than the LIDAR measurements.
- Extended Kalman Filter tracking by utilizing both measurements from both LIDAR and RADAR can reduce the noise/errors from the sensor measurements, and provide the robust estimations of the tracked object locations.
Note: the advantage of RADAR is that it can estimate the object speed directly by Doppler effect.
The LIDAR will produce 3D measurement px,py,pz. But for the case of driving on the road, we could simplify the pose of the tracked object as: px,py,and one rotation. In other words, we could only use px and px to indicate the position of the object, and one rotation to indicate the orientation of the object. But in real world where you have very steep road, you have to consider z axis as well. Also in application like airplane and drone, you definitely want to consider pz as well.
Sensor type | LIDAR | RADAR | Camera |
---|---|---|---|
Resolution | median | low | high |
Direct velocity measure | no | yes | no |
All-weather | bad | good | bad |
Sensor size | large | small | small |
sense non-line of sight object | no | yes | no |
Note:
- LIDAR wavelength in infrared; RADAR wavelength in mm.
- LIDAR most affected by dirt and small debris.
One comparison Figure from another aspect.
- x is the mean state vector.
- F is the state transition function.
- P is the state covariance matrix, indicating the uncertainty of the object's state.
- u is the process noise, which is a Gaussian with zero mean and covariance as Q.
- Q is the covariance matrix of the process noise.
For EKF
- To calculate predicted state vector x′, the prediction function f(x), is used instead of the F matrix.
- The F matrix will be replaced by Fj (jocobian matrix of f) when calculating P′.
- y is the innovation term, i.e. the difference between the measurement and the prediction. In order to compute the innovation term, we transform the state to measurement space by measurement function, so that we can compare the measurement and prediction directly.
- S is the predicted measurement covariance matrix, or named innovation covariance matrix.
- H is the measurement function.
- z is the measurement.
- R is the covariance matrix of the measurement noise.
- I is the identity matrix.
- K is the Kalman filter gain.
- Hj and Fj are the jacobian matrix.
For EKF
- To calculate innovation y, the measurement function h(x') is used instead of the H matrix.
- The H matrix in the Kalman filter will be replaced by the Hj(Jacobian matrix of h(x'))when calculating S, K, and P.
All Kalman filters have the same three steps:
- Initialization
- Prediction
- Update
A standard Kalman filter can only handle linear equations. Both the Extended Kalman Filter (EKF) and the Unscented Kalman Filter (UKF will be disuccsed in the next project) allow you to use non-linear equations; the difference between EKF and UKF is how they handle non-linear equations: Extended Kalman Filter uses the Jacobian matrix to linearize non-linear functions; Unscented Kalman Filter, on the other hand, does not need to linearize non-linear functions, insteadly, the unscented Kalman filter takes representative points from a Gaussian distribution.