$X_1,X_2,...$ is a sequence of i.i.d. random variables that are uniformly distributed in [0,2]. Show that $\prod_{i=1}^N X_i$ converges to 0 in probability. Hint: Use the law of large numbers and Jensen's inequality. As sums and products are involved I think that Jensen has to be used with the fu...

$\DeclareMathOperator\Var{Var}\DeclareMathOperator\Motives{Motives}$Let us assume for the moment that we have a "nice" category of motives, that is for fields $k$ we have a contravariant functor $$\Var(k)\to \Motives(k).$$ Now for any field extension $l/k$, we have a natural forgetful functor $$\...

The Stacks Project proves Thomason's insight that compact objects of the derived category $\simeq$ bounded complexes of finitely generated projective modules in Section 15.78, but the running conventions of the Stacks Project assume that all rings are commutative. I believe the insight is origina...

I am trying to prove the following. (I posted this on math.se with no success) Let $E,B$ be Riemannian manifolds. Suppose $\pi: E\to B$ is a Riemannian submersion. For each $x\in E$, define $V_x E = \ker \pi_{*}$ and $H_xE = (V_x E)^{\perp}$. $W\in T_x E$ is said to be horizontal if $W\in H_x ...