Processing A Textbook Derivation: The Stochastic Crb For Array

[ \mathbfx(t) \sim \mathcalCN(\mathbf0, \mathbfR) ] [ \mathbfR(\boldsymbol\theta, \mathbfp, \sigma^2) = \mathbfA(\boldsymbol\theta) \mathbfP \mathbfA^H(\boldsymbol\theta) + \sigma^2 \mathbfI ]

[ \textCRB(\boldsymbol\theta) = \frac\sigma^22N \left[ \Re \left( \mathbfD^H \mathbf\Pi_A^\perp \mathbfD \odot \mathbfP^T \right) \right]^-1 ] ( p_k ) [ \frac\partial \mathbfR\partial p_k =

where ( \boldsymbol\eta ) is the real parameter vector. the standard result uses:

This is the Schur complement of the nuisance parameter block. Let ( \mathbf\Pi_A^\perp = \mathbfI - \mathbfA(\mathbfA^H\mathbfA)^-1\mathbfA^H ) (projector onto noise subspace). 4.1 Derivative w.r.t. ( \theta_k ) [ \frac\partial \mathbfR\partial \theta_k = \mathbfA_k' \mathbfP \mathbfA^H + \mathbfA \mathbfP (\mathbfA_k')^H ] where ( \mathbfA_k' = \frac\partial \mathbfA\partial \theta_k = [\mathbf0, \dots, \mathbfa'(\theta_k), \dots, \mathbf0] ) (derivative of the ( k )-th column). 4.2 Derivative w.r.t. ( p_k ) [ \frac\partial \mathbfR\partial p_k = \mathbfa(\theta_k) \mathbfa^H(\theta_k) ] (because ( \mathbfP ) is diagonal). 4.3 Derivative w.r.t. ( \sigma^2 ) [ \frac\partial \mathbfR\partial \sigma^2 = \mathbfI ] 5. Simplifying the FIM Blocks We use: ( \mathbfR^-1 = \sigma^-2 \mathbf\Pi_A^\perp ) only if ( \mathbfA ) is full rank and ( \mathbfP ) nonsingular? Actually, via Woodbury: [ \mathbfR^-1 = \sigma^-2 \left( \mathbfI - \mathbfA (\mathbfA^H \mathbfA + \sigma^2 \mathbfP^-1)^-1 \mathbfA^H \right) ] But for CRB derivations, a cleaner way: define ( \mathbfR^-1/2 \mathbfA = \mathbfU \Sigma \mathbfV^H ) etc. However, the standard result uses: [ \mathbfx(t) \sim \mathcalCN(\mathbf0