Lamellar phase solutions for diblock copolymers with nonlocal diffusions

Abstract

For a diblock copolymer with total chain length γ>0 and mass ratio m∈(-1,1), we consider the problem of minimizing the doubly nonlocal free energy E(u) =H(u) +12s ∫W(u)\,dx +12∫ |(-γ2)-12(u-m)|2\,dx in a domain , where H(u) is a fractional Hs-norm with s∈(0,12), and W is a double-well potential. This arises in the study of micro-phase separation phenomena for diblock copolymers with nonlocal diffusions. On the unit interval, we identify the -limit as 0+, and also find explicit isolated local minimizers associated the lamellar morphology phase in the case m=0, provided that the chain is sufficiently short or the nonlocal interaction is sufficiently strong (i.e. as s0+). We stress that such extra condition is new for the nonlocal case and is not present in the classical model. The proof, while elementary, requires a careful analysis of the nonlocal integrals.