Equivalence of Likelihoods The two quantities L_{\beta_k = 0}^*= \sup_{\beta_{-k} \in \mathbb{R}^{k-1}, \beta_k=0} L(y, \boldsymbol{\beta}) and L^*_{-k} = \sup_{\beta_{-k} \in R^{k-1}} L_{k-1} (y, \boldsymbol{\beta}) ...

There is no 8 by 8 circulant Hadamard matrix. Write an n by n Hadamard matrix H as [v_1,\dots,v_n], where v_k is the k-th row. The condition of being Hadamard means that all rows of H ...

If A denotes the 3\times 3-matrix of your equation Ax=b, then \det(A)=-2(a-1)(a+1). Hence if the field has not characteristic two, and (a-1)(a+1)\neq 0, then we have a unique solution. You ...

Question 1: Given your joint probability model \left( \begin{array}{ccc} {\bf{X}} \\ {\bf{Y}} \end{array}\right) \sim N\left(\left(\begin{array}{ccc}\mu_{1}\boldsymbol{1}\\ \mu_{2}\boldsymbol{1}\end{array}\right), \begin{bmatrix} \boldsymbol\Sigma_{11} & \boldsymbol\Sigma_{12} \\ \boldsymbol\Sigma_{21} & \boldsymbol\Sigma_{22} \end{bmatrix} \right)=N\left(\left(\begin{array}{ccc}\mu_{1}\boldsymbol{1}\\ \mu_{2}\boldsymbol{1}\end{array}\right), T\otimes H(\phi)\right) ...

The numerical result that you got is (almost) correct, but it looks like you might not be interpreting it correctly. Szeliski glosses over this stuff rather quickly. First, observe that the ...

The underlying problem is that your series is not stationary! After you simulate your series y_t. R is computing the sample mean over time as: \bar{y} = \frac{1}{T} \sum_{\tau = 1}^T y_\tau ...