Slide 30 of these lecture notes for reinforcement learning contains this "Bellman equation":
$$ Q^*(s, a) = \mathbb{E}_{s'\sim\varepsilon} \left[ r + \gamma \max_{a'} Q^*(s', a') \mid s, a \right]$$
Everything else makes sense to me, but what does the "$\sim\varepsilon$" part mean?
It is not an $\epsilon$, but an $\mathcal{E}$, which probably stands for environment. The more common notation in RL is
$$Q^*(s,a)=\mathbb{E}_{s'\sim p(\cdot\mid s,a)}[r(s,a)+\gamma \max_{a'}Q^*(s',a')\mid s,a]. $$
What it means is that we take action $a$ in state $s$. Then, the environment returns a state $s'$. So, it is an expectation over all possible new states, when taking action $a$ in state $s$.
Symbolizes the expected error.
