Formulas of Rise time, settling time, and other step-response characteristics for arbitrary-order transfer function
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How the parameters of transients are estimated (as in the picture) from an arbitrary linear transfer function (formula is given) ?
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Star Strider
2021 年 8 月 16 日
If you are estimating the transfer function from data, use the System Identification Toolbox functions, specifically iddata and ssest, since it is more robust than tfest, although tfest might be preferable in this instance. Then (if necessary) use the tf function to turn the state space realisation into a transfer function, and then use sys.Numerator and sys.Denominator (for example) to get the coefficients.
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Star Strider
2021 年 8 月 16 日
I read it carefully. It initially appears to be a system identification and parameter estimation problem:
‘How the parameters of transients are estimated (as in the picture) from an arbitrary linear transfer function (formula is given) ?’
Once the parameters of the transfer function itself are known, it can be modeled as a simplified differential equation (initially in Laplace space, then inverted), and the parameters estimated from it as described in the Wikipedia article on Step response. I am in no way claiming that for an arbitrary stable transfer function it would be a trivial computation, however it would (theoretically, since I have never actually attempted this) be possible.
.
その他の回答 (1 件)
Sulaymon Eshkabilov
2021 年 8 月 16 日
Use step(), e.g.:
SYS = tf(1, [1 1 2]);
step(SYS)
% Move the cursor over the plot and use the right mouse button options,
% -> characteristics -> Peak time, Settling time, etc.
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