The proof consists of two steps. Let M be the convex set (equipped with the weak *-topology) of Borel probability measures on X. The transformation acts on M and the main thing is to show that ...

\frac{dC}{dt}=\frac{dA}{dt}\frac{dC}{dA} C=2\pi r= 2\frac{\pi r^2}{r}=2\frac{A}{r} (since A=\pi r^2 ) and A=\pi r^2 \implies r=\sqrt{\frac{A}{\pi}} Therefore using the previous 2 ...

We start with a little Lemma: Lemma. Let E\subseteq \Bbb R. If H\supseteq E is a G_\delta set (countable intersection of open sets) such that m(H)=m^\ast(E), then for every C\subseteq\Bbb R ...

For each m\in\mathbb N, you know that there is a family (U_{k,m})_{k\in\mathbb N} of open sets in \mathbb{R}^n such that A\subset\bigcup_{k\in\mathbb N}U_{k,m} and that \sum_{k=1}^\infty l(U_{k,m})<\mu^*(A)+\frac1m ...

If D>0 then the necessary and sufficient condition for e^{C t}D to have a negative coordinate is for e^{Ct} to have a negative entry. This is because when the row where the negative entry is ...

Indeed, if p=\mathsf P(E\cup F) then (1-p) = \mathsf P(E^\complement\cap F^\complement). (1-p)^{n-1}\mathsf P(E) is therefore the probability for a particular sequence of n-1 trials where ...