arielleon said:
More specifically, consider a Hamiltonian with a changeable parameter a. When changing a, the ground state of the system will change. In some cases, one phase crossovers to another, like in other cases, there's a phase transition. What factor determines the difference? Actually I am now working on a specific model, the Dicke model. And I want to consider the above question in this and related model. So before that, I want some general guidances about the question to get to the point quicker. Thx.
A phase transition is characterised by non-analytic (smooth or continuous) changes. Crossovers will not have this non-analytic behaviour.
That, at least, is the definition. However, in practice, several things complicate matters.
1. Finite size. Truly singular behaviour can only occur in thermodynamic systems, with infinite volume/particle number, etc. Real systems, especially those used in experiments with cold atoms or (for you?) exciton/polariton systems, are finite and sometimes very finite (N is O(100)). This will prevent singularities from being directly observed, but sometimes some work based on finite-size scaling can recover the theoretical limit.
2. Suppose that the discontinuity is in a high order (high derivative). This will again usually end up being obscured by experimental noise, etc.
3. It's usually *very* hard to tune a system to be actually on the phase transition itself, which will tend again to round off singularities.
In real life these things tend to be the basis for some very fervent discussions (see BCS/BEC literature, or cuprates, for examples of where decades of arguments were essentially on whether the observed phenomenon were really phase transitions).
If you don't mind me asking, where are you working/studying?
