Let \mathcal A:=\bigcup_{I\in\mathcal I}\mathcal A_I\;\;\;\text{and}\;\;\;\mathcal B:=\bigcup_{I\in\mathcal I}\mathcal B_I\;. Claim 1 \; \mathcal A is \cap-stable. Proof : \; Let A,B\in\mathcal A ...

We have to find the maximum of Q(f):=\min\bigl\{E(f),E(1/f)\bigr\} over all f:\>[0,1]\to[a,b], whereby 0<a<1<b are given and fixed. I claim that whenever E(f)\ne E(1/f) the value Q(f) can ...

Infinity is not a real number. The real numbers form a field \Bbb R under the well-known addition and multiplication, and in such a field x+x=x implies x=0, so there cannot be another real ...

Your minimum variance problem is: \begin{equation} \begin{array}{*2{>{\displaystyle}r}} \mbox{minimize (over a_i)} & \mathrm{Var}\left( \sum_i a_i y_i \; \middle| \; \{x_i\}\right) \\ \mbox{subject to} & \mathrm{E}\left[\sum_i a_iy_i \; \middle|\;\{x_i\}\right] = b \end{array} \end{equation} ...

It suffices to prove that \int_0^t \phi_s^2 \, ds is finite for all t \in [0,\infty). This allows us to define the stochastic integral \int_0^t \phi(s) \, dB_s for any t \in [0,\infty) (as a ...

My apologies to the people who have already answered, but I found a way which does not involve any difficult estimates: take a rectangular contour above the poles and let the vertical edges go off to ...