Let $\mu(X) =1$.
Let $f,g \in L^1(X)$ be two positive functions satisfying $f(x) g(x)>1$ for almost all $x$, Then $\left(\int f ~dx\right) \left(\int g~dx\right) \geq 1.$
Show also that if $f,g\in L^2(X)$ with $\int f ~dx= 0$, then $\left(\int fg~dx\right)^2 \leq \left[ \int g^2 ~dx - \left(\int g~dx\right)^2 \right] \int f^2~dx.$
I think I have to use Holder's inequality for both questions:
For the first question, since $\mu(X) =1$, $1\lt \int fg~dx$. How do I apply Holder's inequality.