Odd-even effect in the dominant order of self-assembly of cross junctions in space dimension d 3

Abstract

We consider the self-assembly of cross junctions in a general space dimension (d) as an extension of the problem studied in a previous paper for d = 3. This problem is equivalent to constructing a d-dimensional hypercubic jungle gym, at all junctions of which 2d rods with different colours meet. The analysis reveals a unique feature of the d = 3 case: the forced presence of at least one perfectly-ordered (singly coloured) direction (axis), in contrast to the possible absence of such a direction in d 4. However, we will show that the uniaxial order is overwhelming not only in d=3 but also for 4 d 7 and odd d 9 in a sufficiently large system. For even d 8, isotropic states dominate, leading to the alternation of dominant states between the uniaxial and isotropic orders depending on the parity of d 7.