Homogenization in fractional phase transitions at the critical scale

Abstract

We analyze fractional phase-transition energies with periodic hetero\-genei\-ties at the critical H1/2 scaling. We prove that the Γ-limit is a sharp-interface functional whose surface energy density combines homogenization and averaging effects. The resulting coefficient is a weighted combination of the minimum and the mean of the oscillatory parameter, reflecting the coexistence of multiple interaction scales. This behavior is specific to the critical regime and differs from the case s>1/2.