% Verbal description for system iTwoLink (iTwoLink_desc.tex)
% Generated by MTT on Mon Nov 17 10:42:48 GMT 1997.
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% %% Revision 1.3 1998/01/19 10:08:21 peterg
% %% Added comment about linearisation point
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% %% Revision 1.2 1998/01/19 09:57:26 peterg
% %% Added a discussion of the relevance of G(s).
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% Revision 1.1 1997/12/09 16:53:27 peterg
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The acausal bond graph of system \textbf{iTwoLink} is
displayed in Figure \Ref{iTwoLink_abg} and its label
file is listed in Section \Ref{sec:iTwoLink_lbl}.
The subsystems are listed in Section \Ref{sec:iTwoLink_sub}.
This example illustrates the inversion of two link manipulator
dynamics using two identical simple mass-spring-damper systems as
specification systems.
The velocities $\omega_1=\omega_2$ specified by the specification
systems are given in Figure \Ref{fig:iTwoLink_odeso.ps-iTwoLink-t1s}
together with the input defined in Section \Ref{sec:iTwoLink_input.txt}.
The torques $\tau_1$ and $\tau_2$ required to give the these
velocities specified by the specification system are given in Figures
\Ref{fig:iTwoLink_odeso.ps-iTwoLink-t1} and
\Ref{fig:iTwoLink_odeso.ps-iTwoLink-t2} respectively.
The corresponding velocity/torque diagrams for joints 1 and 2 appear in
Figures \Ref{fig:iTwoLink_odeso.ps-iTwoLink-t1s:iTwoLink-t1}
\Ref{fig:iTwoLink_odeso.ps-iTwoLink-t2s:iTwoLink-t2} respectively.
Such diagrams can be used for actuator sizing in terms of torque,
velocity and power.
This non-linear system can be linearised (about the various
configurations) and small-signal frequency response methods applied.
For example, the four transfer functions $G_11$ to $G_22$ in Section
\Ref{sec:iTwoLink_tf} (representing the system linearised about zero
angles and velocities), give the small-signal relations between the
two spec. torques and the required system torques. Used together with
$G_31$ and $G_42$ (relating the spec. torques and the joint
velocities) gives, in principle, a method for evaluating actuator
requirements (for small signals) as a function of frequency.