The requirements for a system to be considered as being at equilibrium are
- thermal: temperature the same throughout
- mechanical: pressure the same throughout
- chemical: chemical potential for each species the same throughout
The chemical potential for a species $\mu_j$ (energy per mole $j$) expands to
$$\mu_j = \left(\frac{\partial G}{\partial n_j} \right)_{T,p,n_i \neq n_j} = \left(\frac{\partial A}{\partial n_j} \right)_{T,V,n_i \neq n_j} = \left(\frac{\partial U}{\partial n_j} \right)_{S,V,n_i \neq n_j} = \left(\frac{\partial H}{\partial n_j} \right)_{S,p,n_i \neq n_j}$$
The conditions on chemical equilibrium are therefore independent to what parameters we hold constant during a process.
The Gibbs phase rule for an electrically neutral reaction system (e.g. not redox reactions) is
$$ F = (C - R) - \Pi + 2 $$
where $F$ is the degrees of freedom, $C$ the number of chemical components, $R$ the number of independent chemical reactions linking the components, and $\Pi$ the number of phases in the system. The consistent application with the Gibbs phase rule is to determine the maximum degrees of freedom (number of intensive parameters) that must be used to completely specify the equilibrium state for a system
$$F_{max} = (C - R) + 1 $$
or to establish the maximum number of phases that we can ever expect to see in a system
$$\Pi_{max} = (C - R) + 2 $$
One other consistent use is to predict the actual number of parameters we have left at our disposal when we see a certain number of phases
$$F_{act} = (C - R) - \Pi_{act} + 2 $$
We can consider the difference $F_{max} - F_{act}$ to be the number of parameters that Mother Nature has taken from us (because we demand $\Pi_{act}$ phases).
Finally, we distort the Gibbs phase rule when we use it to try to predict the number of phases that we might see under certain conditions of $T,p$. We could see more ($\Pi_{act} > \Pi{predicted}$) but we will never see more than the maximum.
