Let $(\Omega, \mathcal{A}, \mathbb P)$ be a probability space with $\mathcal{A}$ countably generated, and let $P: \mathcal{A} \times \Omega \to [0,1]$ be a random probability measure. By that I mean $P$ is a probability measure on $(\Omega, \mathcal{A})$ in its first argument and an a $\mathcal{A}$-measurable function in its second argument.
Assume that for all $A \in \mathcal{A}$ $$\mathbb P(A) = \int P(A,\omega)\mathbb P(d\omega), \tag{1}$$ and that for $\mathbb P$ almost every $\omega$ and all $A \in \mathcal{A}$ $$P(A, \omega) = \int P(A, \omega')P(d\omega', \omega).\tag{2}$$
For each $\omega \in \Omega$, let $C_\omega = \{\omega' \in \Omega: P(\cdot, \omega') = P(\cdot, \omega)\}$.
Do (1) and (2) imply that for $\mathbb{P}$ almost every $\omega$ $$P(C_\omega, \omega)=1? \tag{3}$$ Does (2) imply (3) without (1)? Can the assumption that $\mathcal{A}$ is countably generated be dropped?
It's easy to see that $(3)$ implies (2), and this paper (Theorem 2) asserts that the answer to my first question is affirmative, by "advanced ergodic theory." I have been unable to reconstruct the argument that (1) and (2) imply (3), with ergodic theory or otherwise.
