On minima of sum of theta functions and Mueller-Ho Conjecture

Abstract

Let z=x+iy ∈ H:=\z= x+ i y∈C: y>0\ and θ (s;z)=Σ(m,n)∈Z2 e-s π y |mz+n|2 be the theta function associated with the lattice = Z z Z. In this paper we consider the following pair of minimization problems H θ (2;z+12)+θ (1;z),\;\;∈[0,∞), H θ (1; z+12)+θ (2; z),\;\;∈[0,∞), where the parameter ∈[0,∞) represents the competition of two intertwining lattices. We find that as varies the optimal lattices admit a novel pattern: they move from rectangular (the ratio of long and short side changes from 3 to 1), square, rhombus (the angle changes from π/2 to π/3) to hexagonal; furthermore, there exists a closed interval of such that the optimal lattices is always square lattice. This is in sharp contrast to optimal lattice shapes for single theta function (=∞ case), for which the hexagonal lattice prevails. As a consequence, we give a partial answer to optimal lattice arrangements of vortices in competing systems of Bose-Einstein condensates as conjectured (and numerically and experimentally verified) by Mueller-Ho Mue2002.