Suppose $f:\Bbb R \to \Bbb R$ is in $L^p$ for some $p>1$ and also in $L^1$. Prove there exist constants $c>0$ an $\alpha \in (0,1)$ such that
$\int_A|f(x)|dx\le cm(A)^{\alpha}$, for every Borel measurable set $A\subset \Bbb R$, where $m$ Lebesgue measure.
Actually, I didn't get any concrete idea how to start. I tried Holders, splitting $f(x)$ into two parts with conjugate powers. It took me nowhere.. Can you just give me idea so that i can start it..
Hint: Holder's inequality with $f$ and $g(x)=1$.