See the explanation below Explanation: The matrices are \displaystyle{I}={\left(\begin{array}{ccc} {1}&{0}&{0}\\{0}&{1}&{0}\\{0}&{0}&{1}\end{array}\right)} \displaystyle{J}={\left(\begin{array}{ccc} {1}&{1}&{1}\\{1}&{1}&{1}\\{1}&{1}&{1}\end{array}\right)} ...

I'll sketch an answer. I use the notation: \psi_k(z) = \sum_{n=0}^\infty \frac{\Gamma(\frac{1}{k} + \frac{2n}{k})}{\Gamma(\frac12 + n)} \cdot \frac{z^n}{n!}, and \phi_k(z) = \int_{0}^\infty \cos(z t)e^{-t^k} \, \rm{d} t. ...

It certainly means that what's on the left of ":" is the first column of the matrix that results from the product, and what's on the right is the second column.

Break into cases by the number of possible eigenvalues. If M is diagonal or has two distinct eigenvalues it is diagonalizable, so is similar to the first type. Otherwise there is only a single ...

Low-tech answer: By explicit computation (using a^2+bc=-1), A^2=-I. Since -1 has no square in \mathbb{R}, A has no eigenvalues over \mathbb{R}. So given any nonzero vector v, Av is ...

The determinant of the matrix is a^2 + b^2, not a^2 - b^2. This is non-zero if and only if at least one of a and b is non-zero. This assumes that a and b are real; otherwise, the issue is ...