Non-hexagonal lattices from a two species interacting system

Abstract

A two species interacting system motivated by the density functional theory for triblock copolymers contains long range interaction that affects the two species differently. In a two species periodic assembly of discs, the two species appear alternately on a lattice. A minimal two species periodic assembly is one with the least energy per lattice cell area. There is a parameter b in [0,1] and the type of the lattice associated with a minimal assembly varies depending on b. There are several thresholds defined by a number B=0.1867... If b ∈ [0, B), a minimal assembly is associated with a rectangular lattice whose ratio of the longer side and the shorter side is in [3, 1); if b ∈ [B, 1-B], a minimal assembly is associated with a square lattice; if b ∈ (1-B, 1], a minimal assembly is associated with a rhombic lattice with an acute angle in [π3, π2). Only when b=1, this rhombic lattice is a hexagonal lattice. None of the other values of b yields a hexagonal lattice, a sharp contrast to the situation for one species interacting systems, where hexagonal lattices are ubiquitously observed.