I want to prove the estimate
\begin{equation*} P(|A+B|>c)\leq P(|A|>c/2)+P(|B|>c/2), \end{equation*}
where $A$ and $B$ are random variables and $c>0$. Can anyone help?
I want to prove the estimate
\begin{equation*} P(|A+B|>c)\leq P(|A|>c/2)+P(|B|>c/2), \end{equation*}
where $A$ and $B$ are random variables and $c>0$. Can anyone help?
Hint: Use the following: If $|A|\leq c/2$ and $|B|\leq c/2$, then $|A+B|\leq c$. It might be useful to negate this statement and then use the subadditivity of the probability measure.
Yes, it directly follows from the union bound.