DiscreteLQEstimatorGains

DiscreteLQEstimatorGains[ssm,{w,v},τ]

gives the optimal discrete-time estimator gain matrix with sampling period τ for the continuous-time StateSpaceModel ssm, with process and measurement noise covariance matrices w and v.

DiscreteLQEstimatorGains[{ssm,sensors},{w,v},τ]

specifies sensors as the noisy measurements of ssm.

DiscreteLQEstimatorGains[{ssm,sensors,dinputs},{w,v},τ]

specifies dinputs as the deterministic inputs of ssm.

Details and Options

The standard state-space model ssm can be given as StateSpaceModel[{a,b,c,d}], where a, b, c, and d represent the state, input, output, and transmission matrices of the continuous-time system .
The descriptor continuous-time state-space model ssm defined by can be given as StateSpaceModel[{a,b,c,d,e}].
The input can include the process noise , as well as deterministic inputs .
The argument dinputs is a list of integers specifying the positions of in .
The output consists of the noisy measurements , as well as other outputs.
The argument sensors is a list of integers specifying the positions of in .
DiscreteLQEstimatorGains[ssm,{…},τ] is equivalent to DiscreteLQEstimatorGains[{ssm, All,None},{…},τ].
The noisy measurements are modeled as , where and are the submatrices of and associated with , and is the noise.
The process and measurement noises are assumed to be white and Gaussian:
, process noise

, measurement noise
The estimator with the optimal gain minimizes , where is the estimated state vector.
DiscreteLQEstimatorGains computes the estimator gains based on the discrete equivalent of the noise matrices.
The state-space model ssm is discretized using the zero-order hold method.