A note on the recovery sequence in the double gradient model for phase transitions

Abstract

We investigate the inequality in the double gradient model for phase transitions governed by a Modica--Mortola functional with a double-well potential in two dimensions. Specifically, we consider energy functionals of the form \[ E(u, ) = ∫ ( 1 W(∇ u) + |∇2 u|2 ) dx \] for maps u ∈ H2(; R2) , where W vanishes only at two wells. Assuming a bound on the optimal profile constant -- namely the cell problem on the unit cube -- in terms of the geodesic distance between the two wells, we characterise the limiting interfacial energy via periodic recovery sequences as 0+.

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