Droplet phase in a nonlocal isoperimetric problem under confinement

Abstract

We address small volume-fraction asymptotic properties of a nonlocal isoperimetric functional with a confinement term, derived as the sharp interface limit of a variational model for self-assembly of diblock copolymers under confinement by nanoparticle inclusion. We introduce a small parameter η to represent the size of the domains of the minority phase, and study the resulting droplet regime as η 0. By considering confinement densities which are spatially variable and attain a nondegenerate maximum, we present a two-stage asymptotic analysis wherein a separation of length scales is captured due to competition between the nonlocal repulsive and confining attractive effects in the energy. A key role is played by a parameter M which gives the total volume of the droplets at order η3 and its relation to existence and non-existence of Gamow's Liquid Drop model on R3. For large values of M, the minority phase splits into several droplets at an intermediate scale η1/3, while for small M minimizers form a single droplet converging to the maximum of the confinement density.