A minimizing set A need not be unique. Consider for example f(x) = \begin{cases} 1 \quad \text{if}\; x \in [0,1] \\ 0 \quad \text{otherwise} \end{cases} By construction \int_\mathbb{R} f = 1 ...

Edit: Incorporated simplification and shortening of the argument suggested by Didier. Thanks! By a) we know that \frac{1}{2} \int_{0}^{1} f(x)\,dx = 0. Therefore \begin{align*} \int_{0}^{1} ...

\newcommand{\E}{\mathbb{E}} Yes, indeed it is normally distributed, and covariance can be calculated. Without loss of generality, let \sigma^2 = 1 , as we can simply multiply by \sigma at ...

Directly proving that f_{\varepsilon} is integrable is rather unnecessary since C_c^\infty(\Omega) \subset C_c(\Omega) \subset L_1(\Omega). It's a general fact of convolution that f*g is at ...

Let t\in(0,1), so 0<t<1. Then the choice \epsilon=\min\{t,1-t\} first of all guarantees that \epsilon>0 (because t>0 and 1-t>1-1=0) as required. Moreover, t-\epsilon\ge 0 because \epsilon\le t ...

Your proof that S\subseteq Q_p is not correct; all you have shown is that every element of the form xx is in S, which again shows that Q_p\subseteq S. First show that S\cap T = \emptyset: ...