The only connection I can see between the two systems is if f(0,y) = 0, in which case the solutions of your second system with x=0 are also solutions of the first system.

There is no recursive non-admissible numbering for which this PAS is a PCA. Suppose a recursive numbering \varphi_0, \varphi_1, \dotsc forms a PCA. We show that this numbering is admissible by ...

Because the determinant of the matrix is zero, it is impossible to invert the mapping.

I agree that the goal is to prove \mathbb{E}[X\cdot|X|]=0 and I also think that a reasonable way of doing so is to look at the corresponding integral. However, you do not need the density function ...

By definition of d(x,S), there exists an infinite sequence \{y_{i}:i\in\mathbb{Z}\} such that d(x,y_{i}) converges to d(x,S). Denote the set C=\{y_{i}:i\in\mathbb{Z}\}\subset S. It is easy ...

HINT We have that \ [T] = \begin{bmatrix} 1 & 2 \\ 0 & 1\end{bmatrix} and we are looking for M=[v_1\, v_2] such that Tx=y \iff TMu=Mv\iff M^{-1}TMu=v then [T]_B= M^{-1}[T]M \iff M[T]_B= [T]M