Contact Dynamics Modelling for Robots
Contact Dynamics Modelling for Robots Contact Dynamics Modelling for Robots
Introduction Impulse-momentum contact Point contact Friction forces Contact in robot dynamics modelling Conclusions Putting it all together 2-link planar manipulator Example simulation F y r1 r2 Dynamic equations τ + T c = D(q)¨q + C(q, ˙q) ˙q + φ(q) where[ ] ((r T c = 1 + r 2 ) × F ) · ˆk (r 2 × F ) · ˆk x Mike Boos Contact Dynamics Modelling for Robots
Introduction Impulse-momentum contact Point contact Friction forces Contact in robot dynamics modelling Conclusions Example simulation 2-link planar manipulator Example simulation Setup y 45˚ 1 m x Slender links of mass 1 kg, length 1 m Initially at rest End effector radius: 5 cm Contact properties of end effector and wall similar to that of steel for Hunt-Crossley τ 1 = −10Nm, τ 2 = −2Nm Mike Boos Contact Dynamics Modelling for Robots
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Introduction<br />
Impulse-momentum contact<br />
Point contact<br />
Friction <strong>for</strong>ces<br />
<strong>Contact</strong> in robot dynamics modelling<br />
Conclusions<br />
Example simulation<br />
2-link planar manipulator<br />
Example simulation<br />
Setup<br />
y<br />
45˚<br />
1 m<br />
x<br />
Slender links of mass 1 kg,<br />
length 1 m<br />
Initially at rest<br />
End effector radius: 5 cm<br />
<strong>Contact</strong> properties of end<br />
effector and wall similar to<br />
that of steel <strong>for</strong><br />
Hunt-Crossley<br />
τ 1 = −10Nm, τ 2 = −2Nm<br />
Mike Boos<br />
<strong>Contact</strong> <strong>Dynamics</strong> <strong>Modelling</strong> <strong>for</strong> <strong>Robots</strong>