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I am working on a 2D space where my robot needs to follow a trajectory while avoiding some obstacles.

I've read recently about methods for path planning as "Vector Field Histogram" and the "Dynamic window approach".

Is it worth to use these kind of algorithms for a 2D space or should I go with something as Potential Fields or Rapidly-Exploring Random Trees?

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There are three fields you have to be aware of. Path planning, motion planning and obstacle avoidance. The combination of these three is usually referred to as "Navigation".

Path planning is the process you use to construct a path from a starting point to an end point given a full, partial or dynamic map. Motion planning is the process by which you define the set of actions you need to execute to follow the path you planned. Obstacle avoidance, as the name suggests, is used to avoid colliding with obstacles during the navigation process.

To develop an efficient and reliable navigation method, you need to: - Have a clear idea about the environment you are trying to navigate (map + minimum gaps) - Determine the motion model and dynamics of your robot - Develop a closed loop control system that constructs a path and follows it accurately.

For instance, if your environment is static (nothing changes), with plenty of space and large openings, and you are trying to move a relatively small robot (10x10 cm). Then probably you don't need to focus on obstacle avoidance as long as your paths go in the middle of the space, and you execute your actions accurately.

Majority of the cases, you use a high level planner to construct a global path, and a local planner (VFH, ND, ...) to act as the motion controller and the obstacle avoidance in a local scale. There is plenty of literature on that front. You can have a look at some of my papers here : http://tarektaha.com/tarektaha.com/download.php?list.4 , and use some of the code I developed as reference here : http://tarektaha.com/tarektaha.com/download.php?list.6

Good luck

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  • Thank you very much, that was pretty enlightening. Though I cannot find the papers that you say. I get the message "Error, page not found".
    – Spyros
    Nov 3 '13 at 13:40

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