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Numeric Models

Numeric Linear Time Invariant (LTI) Models

Numeric LTI models are the basic numeric representation of linear systems or components of linear systems. Use numeric LTI models for modeling dynamic components, such as transfer functions or state-space models, whose coefficients are fixed, numeric values. You can use numeric LTI models for linear analysis or control design tasks.

The following table summarizes the available types of numeric LTI models.

Model TypeDescription
tfTransfer function model in polynomial form
zpkTransfer function model in zero-pole-gain (factorized) form
ssState-space model
frdFrequency response data model
pidParallel-form PID controller
pidstdStandard-form PID controller

Identified LTI Models

Identified LTI Models represent linear systems with coefficients that are identified using measured input/output data (requires System Identification Toolbox™ software). You can specify initial values and constraints for the estimation of the coefficients.

The following table summarizes the available types of identified LTI models.

Model TypeDescription
idtfTransfer function model in polynomial form, with identifiable parameters
idssState-space model, with identifiable parameters
idpolyPolynomial input-output model, with identifiable parameters
idprocContinuous-time process model, with identifiable parameters
idfrdFrequency-response model, with identifiable parameters
idgreyLinear ODE (grey-box) model, with identifiable parameters

Identified Nonlinear Models

Identified Nonlinear Models represent nonlinear systems with coefficients that are identified using measured input/output data (requires System Identification Toolbox software). You can specify initial values and constraints for the estimation of the coefficients.

The following table summarizes the available types of identified nonlinear models.

Model TypeDescription
idnlarxNonlinear ARX model, with identifiable parameters
idnlgreyNonlinear ODE (grey-box) model, with identifiable parameters
idnlhwHammerstein-Wiener model, with identifiable parameters

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