The plate notation can be generalised to specify state-space models (SSMs):
Each SSM is fully characterised by the prior over the initial state, $p(x_0)$; the transition dynamics, $p(x_t \mid x_{t-1})$; and the observation model, $p(y_t \mid x_t)$. All of these distributions can be viewed as parameters of the SSM plates, and specified in the "Props" panel.
@FredericWantiez @charlesknipp
The plate notation can be generalised to specify state-space models (SSMs):
Each SSM is fully characterised by the prior over the initial state,$p(x_0)$ ; the transition dynamics, $p(x_t \mid x_{t-1})$ ; and the observation model, $p(y_t \mid x_t)$ . All of these distributions can be viewed as parameters of the SSM plates, and specified in the "Props" panel.
@FredericWantiez @charlesknipp