KDER – Derivation and filtering of the input signal
Block SymbolLicensing group: ADVANCED
Function Description
The KDER block is a Kalman-type filter of the norder-th order aimed at estimation of
derivatives of locally polynomial signals corrupted by noise. The order of derivatives ranges
from
to .
The block can be used for derivation of almost arbitrary input signal
,
assuming that the frequency spectrums of the signal and noise differ.
The block is configured by only two parameters pbeta and norder. The pbeta parameter depends on the sampling period , frequency properties of the input signal u and also the noise to signal ratio. An approximate formula can be used. The frequency spectrum of the input signal u should be located deep down below the cutoff frequency . But at the same time, the frequency spectrum of the noise should be as far away from the cutoff frequency as possible. The cutoff frequency and thus also the pbeta parameter must be lowered for strengthening the noise rejection.
The other parameter norder must be chosen with respect to the order of the estimated derivations. In most cases the 2nd or 3rd order filter is sufficient. Higher orders of the filter produce better derivation estimates for non-polynomial signals at the cost of slower tracking and higher computational cost.
This block propagates the signal quality. More information can be found in the 1.4 section.
Input
u | Input signal to be filtered | Double (F64) |
Parameter
norder | Order of the derivative filter 2 10 3 | Long (I32) |
pbeta | Bandwidth of the derivative filter 0.0 0.1 | Double (F64) |
Output
y | Filtered input signal | Double (F64) |
dy | Estimated 1st order derivative | Double (F64) |
d2y | Estimated 2nd order derivative | Double (F64) |
d3y | Estimated 3rd order derivative | Double (F64) |
d4y | Estimated 4th order derivative | Double (F64) |
d5y | Estimated 5th order derivative | Double (F64) |
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