Longtime behavior for a generalized Cahn-Hilliard system with fractional operators

In this contribution, we deal with the longtime behavior of the solutions to the fractional variant of the Cahn-Hilliard system, with possibly singular potentials, that we have recently investigated in the paper Well-posedness and regularity for a generalized fractional Cahn-Hilliard system . More precisely, we study the ω-limit of the phase parameter y and characterize it completely. Our characterization depends on the first eigenvalues λ 1 ≥0 of one of the operators involved: if λ 1 >0, then the chemical potential μ vanishes at infinity and every element y ω of the ω-limit is a stationary solution to the phase equation; if instead λ 1 =0, then every element y ω of the ω-limit satisfies a problem containing a real function μ ∞ related to the chemical potential μ. Such a function μ ∞ is nonunique and time dependent, in general, as we show by an example. However, we give sufficient conditions for μ ∞ to be uniquely determined and constant.