Let $\xi, \eta$ be a discrete random values and $\mathbb E| ξ |$, $\mathbb E | η |$ < $+\infty$, and any value of these
values ​​are accepted with a non-zero probability. How to prove that from $\mathbb E (ξ | η) ≥ η$, $\mathbb E (η | ξ) ≥ ξ$ follows
$ξ = η$?