Modified Trajectory Shaping Guidance for autonomous parallel parking
- 1 June 2010
- conference paper
- Published by Institute of Electrical and Electronics Engineers (IEEE)
Abstract
This paper presents a novel and computationally inexpensive method for motion planning of autonomous parallel parking of four wheeled nonholonomic vehicles. The proposed method makes use of Trajectory Shaping Guidance, given in [1] and [2], which was originally developed for missiles to hit the target at a given angle. This paper uses a modified version of Trajectory Shaping Guidance (TSG) for path planning. The method computes a feasible path by inherently considering nonholonomic constraints of the vehicle. Detailed simulation results show the robustness, simplicity and efficiency of the proposed method.Keywords
This publication has 9 references indexed in Scilit:
- Autonomous Vehicle Parking Using Hybrid Artificial Intelligent ApproachJournal of Intelligent & Robotic Systems, 2009
- Real-time optimization for parallel-parking control of four-wheeled vehiclesPublished by Institute of Electrical and Electronics Engineers (IEEE) ,2008
- A Navigation-Field-Based Semi-Autonomous Nonholonomic Vehicle-Parking AssistantIEEE Transactions on Vehicular Technology, 2008
- Trajectory-Shape-Varying Missile Guidance for Interception of Ballistic Missiles During the Boost PhasePublished by American Institute of Aeronautics and Astronautics (AIAA) ,2007
- Car parking control using a trajectory tracking controllerPublished by Institute of Electrical and Electronics Engineers (IEEE) ,2006
- Motion generation and control for parking an autonomous vehiclePublished by Institute of Electrical and Electronics Engineers (IEEE) ,2002
- Computation of time optimal movements for autonomous parking of non-holonomic mobile platformsPublished by Institute of Electrical and Electronics Engineers (IEEE) ,2002
- Optimal paths for a car that goes both forwards and backwardsPacific Journal of Mathematics, 1990
- On Curves of Minimal Length with a Constraint on Average Curvature, and with Prescribed Initial and Terminal Positions and TangentsAmerican Journal of Mathematics, 1957