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We have seen that the DW and FDTD schemes correspond to state-space
models which are related to each other by a simple change of
coordinates (similarity transformation). It is well known that such
systems exhibit the same transfer functions, have the same modes, and
so on. In short, they are the same linear dynamic system.
Differences may exist with respect to spatial locality of input
signals, initial conditions, and boundary conditions.
State-space analysis was used to translate initial conditions and
boundary conditions from one case to the other. Passive terminations
in the DW paradigm were translated to passive terminations for the
FDTD scheme, and FDTD excitations were translated to the DW case in
order to interpret them physically.
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