Stewart platform
A Stewart platform is a type of parallel manipulator that has six prismatic actuators, commonly hydraulic jacks or electric linear actuators, attached in pairs to three positions on the platform's baseplate, crossing over to three mounting points on a top plate. All 12 connections are made via universal joints. Devices placed on the top plate can be moved in the six degrees of freedom in which it is possible for a freely-suspended body to move: three linear movements x, y, z (lateral, longitudinal, and vertical), and the three rotations (pitch, roll, and yaw).
Stewart platforms are known by various other names. In many applications, including in flight simulators, it is commonly referred to as a motion base.[1] It is sometimes called a six-axis platform or 6-DoF platform because of its possible motions and, because the motions are produced by a combination of movements of multiple actuators, it may be referred to as a synergistic motion platform, due to the synergy (mutual interaction) between the way that the actuators are programmed. Because the device has six actuators, it is often called a hexapod (six legs) in common usage, a name which was originally trademarked by Geodetic Technology[2] for Stewart platforms used in machine tools.[3]
History
This specialised six-jack layout was first used by V E (Eric) Gough of the UK and was operational in 1954,[4] the design later being publicised in a 1965 paper by D Stewart to the UK Institution of Mechanical Engineers.[5] In 1962, prior to the publication of Stewart's paper, American engineer Klaus Cappel independently developed the same hexapod. Klaus patented his design and licensed it to the first flight simulator companies, and built the first commercial octahedral hexapod motion simulators.[6]
Although the title Stewart platform is commonly used, some have posited that Gough–Stewart platform is a more appropriate name because the original Stewart platform had a slightly different design,[7] while others argue that the contributions of all three engineers should be recognized.[6]
Actuation
Linear actuation
In industrial applications, linear hydraulic actuators are typically used for their simple and unique inverse kinematics closed form solution and their good strength and acceleration.
Rotary actuation
For prototyping and low budget applications, typically rotary servo motors are used. A unique closed form solution for the inverse kinematics of rotary actuators also exists, as shown by Robert Eisele [8]
Applications
Stewart platforms have applications in flight simulators, machine tool technology, animatronics, crane technology, underwater research, simulation of earthquakes, air-to-sea rescue, mechanical bulls, satellite dish positioning, the Hexapod-Telescope, robotics, and orthopedic surgery.
Flight simulation
The Stewart platform design is extensively used in flight simulators, particularly in the full flight simulator which requires all 6 degrees of freedom. This application was developed by Redifon, whose simulators featuring it became available for the Boeing 707, Douglas DC-8, Sud Aviation Caravelle, Canadair CL-44, Boeing 727, Comet, Vickers Viscount, Vickers Vanguard, Convair CV 990, Lockheed C-130 Hercules, Vickers VC10, and Fokker F-27 by 1962.[9]
In this role, the payload is a replica cockpit and a visual display system, normally of several channels, for showing the outside-world visual scene to the aircraft crew that are being trained.
Similar platforms are used in driving simulators, typically mounted on large X-Y tables to simulate short term acceleration. Long term acceleration can be simulated by tilting the platform, and an active research area is how to mix the two.
Robocrane
James S. Albus of the National Institute of Standards and Technology (NIST) developed the Robocrane, where the platform hangs from six cables instead of being supported by six jacks.
LIDS
The Low Impact Docking System developed by NASA uses a Stewart platform to manipulate space vehicles during the docking process.
CAREN
The Computer Assisted Rehabilitation Environment developed by Motek Medical uses a Stewart platform coupled with virtual reality to do advanced biomechanical and clinical research.[10]
Taylor Spatial Frame
Dr. J. Charles Taylor used the Stewart platform to develop the Taylor Spatial Frame,[11] an external fixator used in orthopedic surgery for the correction of bone deformities and treatment of complex fractures.
Mechanical testing
- First application: Eric Gough was an automotive engineer and worked at Fort Dunlop, the Dunlop Tyres factory in Birmingham, England.[12] He developed his "Universal Tyre-Testing Machine" (also called the "Universal Rig") in the 1950s and his platform was operational by 1954.[4] The rig was able to mechanically test tyres under combined loads. Dr. Gough died in 1972 but his testing rig continued to be used up until the late 1980s when the factory was closed down and then demolished. His rig was saved and transported to the Science Museum, London storage facility at Wroughton near Swindon.
- Recent applications: the rebirth of interest for a mechanical testing machine based on Gough-Stewart platform occurred in the mid '90s.[13] They are often biomedical applications (for example spinal study[14]) because of the complexity and large amplitude of the motions needed to reproduce human or animal behaviour. Such requirements are also encountered in the civil engineering field for seism simulation. Controlled by a full-field kinematic measurement algorithm, such machines can also be used to study complex phenomena on stiff specimens (for example the curved propagation of a crack through a concrete block[15]) that need high load capacities and displacement accuracy.
Motion compensation
The Ampelmann system is a motion-compensated gangway using a Stewart platform. This allows access from a moving platform supply vessel to offshore constructions even in high wave conditions.
References
- Becerra-Vargas, Mauricio; Morgado Belo, Eduardo (2012). "Application of H∞ theory to a 6 DOF flight simulator motion base". Journal of the Brazilian Society of Mechanical Sciences and Engineering. 34 (2): 193–204. doi:10.1590/S1678-58782012000200011. Retrieved 24 January 2020.
- Parallel Robots - Second Edition by J.P. Merlet (p. 48)
- Fraunhofer Research: Hexapod Robot for Spine Surgery
- Gough, V. E. (1956–1957). "Contribution to discussion of papers on research in Automobile Stability, Control and Tyre performance". Proc. Auto Div. Inst. Mech. Eng.: 392–394.
- Stewart, D. (1965–1966). "A Platform with Six Degrees of Freedom". Proceedings of the Institution of Mechanical Engineers. 180 (1, No 15): 371–386. doi:10.1243/pime_proc_1965_180_029_02.
- Bonev, Ilian. "The True Origins of Parallel Robots". Retrieved 24 January 2020.
- Lazard, D.; Merlet, J. -P. (1994). "The (true) Stewart platform has 12 configurations". Proceedings of the 1994 IEEE International Conference on Robotics and Automation. p. 2160. doi:10.1109/ROBOT.1994.350969. ISBN 978-0-8186-5330-8. S2CID 6856967.
- Robert Eisele. "Inverse Kinematics of a Stewart Platform". Retrieved 2023-10-25.
- "1962 | 1616 | Flight Archive".
- Computer Assisted Rehabilitation ENvironment (CAREN)
- "J. Charles Taylor, M.D."
- Tompkins, Eric (1981). The History of the Pneumatic Tyre. Dunlop. pp. 86, 91. ISBN 978-0-903214-14-8.
- Michopoulos, John G.; Hermanson, John C.; Furukawa, Tomonari (2008). "Towards the robotic characterization of the constitutive response of composite materials". Composite Structures. 86 (1–3): 154–164. doi:10.1016/j.compstruct.2008.03.009.
- Stokes, Ian A.; Gardner-Morse, Mack; Churchill, David; Laible, Jeffrey P. (2002). "Measurement of a spinal motion segment stiffness matrix". Journal of Biomechanics. 35 (4): 517–521. CiteSeerX 10.1.1.492.7636. doi:10.1016/s0021-9290(01)00221-4. PMID 11934421.
- Jailin, Clément; Carpiuc, Andreea; Kazymyrenko, Kyrylo; Poncelet, Martin; Leclerc, Hugo; Hild, François; Roux, Stéphane (2017). "Virtual hybrid test control of sinuous crack" (PDF). Journal of the Mechanics and Physics of Solids. 102: 239–256. Bibcode:2017JMPSo.102..239J. doi:10.1016/j.jmps.2017.03.001.
Further reading
- Bonev, I.A., "The True Origins of Parallel Robots", ParalleMIC online review