The Stochastic Crb For Array Processing A Textbook Derivation -

where ( \boldsymbol\eta ) is the real parameter vector.

Define the FIM as: [ \mathbfF = \beginbmatrix \mathbfF \theta\theta & \mathbfF \theta p & \mathbfF \theta \sigma^2 \ \mathbfF p\theta & \mathbfF pp & \mathbfF p\sigma^2 \ \mathbfF \sigma^2\theta & \mathbfF \sigma^2 p & \mathbfF_\sigma^2\sigma^2 \endbmatrix ] where ( \boldsymbol\eta ) is the real parameter vector

[ [\mathbfF(\boldsymbol\eta)]_ij = N \cdot \textTr\left( \mathbfR^-1 \frac\partial \mathbfR\partial \eta_i \mathbfR^-1 \frac\partial \mathbfR\partial \eta_j \right) ] where ( \boldsymbol\eta ) is the real parameter vector