The toy cases discussed in Multi-Component Learning and S-Curves are clearly dynamical phase transitions. (It’s easy to establish dynamical phase transitions based on just observation in general. And, in these cases we can verify this property holds for the corresponding differential equations (and step size is unimportant so differential equations are a good model).) Also, I speculate it’s easy to prove the existence of a bayesian phase transition in the number of samples for these toy cases given how simple they are.
Yes I think that’s right. I haven’t closely read the post you link to (but it’s interesting and I’m glad to have it brought to my attention, thanks) but it seems related to the kind of dynamical transitions we talk briefly about in the Related Works section of Chen et al.
Thanks for the detailed response!
So, to check my understanding:
The toy cases discussed in Multi-Component Learning and S-Curves are clearly dynamical phase transitions. (It’s easy to establish dynamical phase transitions based on just observation in general. And, in these cases we can verify this property holds for the corresponding differential equations (and step size is unimportant so differential equations are a good model).) Also, I speculate it’s easy to prove the existence of a bayesian phase transition in the number of samples for these toy cases given how simple they are.
Yes I think that’s right. I haven’t closely read the post you link to (but it’s interesting and I’m glad to have it brought to my attention, thanks) but it seems related to the kind of dynamical transitions we talk briefly about in the Related Works section of Chen et al.