Formation State Estimation and Control: Difference between revisions

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distance to the leader by using attractive potentials, while avoiding collisions
distance to the leader by using attractive potentials, while avoiding collisions
among themselves and obstacles, by using repulsive potentials. To avoid falling
among themselves and obstacles, by using repulsive potentials. To avoid falling
in local minima of the potential fields, the vehicles will recall the '''n''' latest positions
in local minima of the potential fields, the vehicles will recall the <math>n</math> latest positions
of the leader and use this information to move around the obstacle and keep the
of the leader and use this information to move around the obstacle and keep the
formation.
formation.

Revision as of 19:17, 14 November 2008

Multi-robot formation feasibility, formation control and formation state estimation have been subject of research at the ISLab since 2000.

Obstacle Compliant Formation Control

We extended Fiorelli's and Leonard's method of controlling a formation of holonomic vehicles to handle non-holonomic vehicle formations with a given geometry, compliant with nearby obstacles (including those represented by teammates). The vehicles are virtually linked to each other by the influence of artificial potentials that asymptotically stabilize the formation and keep all the robots separated by specified distances. A leader selected from the team, or a virtual reference point, is used to guide the team of autonomous vehicles throughout an area scattered with obstacles. Each vehicle has access to the positions of all its teammates, and senses the obstacles within a limited range of its neighborhood. All robots will try to maintain the specified distance to the leader by using attractive potentials, while avoiding collisions among themselves and obstacles, by using repulsive potentials. To avoid falling in local minima of the potential fields, the vehicles will recall the <math>n</math> latest positions of the leader and use this information to move around the obstacle and keep the formation.

References

Formation Feasibility

We developed a systematic framework for studying formation motion feasibility of multiagent systems. Algebraic conditions that guarantee formation feasibility (i.e., that the specified geometric constraints can be staisfied) given the individual robot kinematics were determined. Our framework also enables us to obtain lower dimensional control systems describing the group kinematics while maintaining all formation constraints.

References