Spectral properties of hyperbolic nano-networks with tunable aggregation of simplexes

Abstract

Cooperative self-assembly can result in complex nano-networks with new hyperbolic geometry. However, the relation between the hyperbolicity and spectral and dynamical features of these structures remains unclear. Using the model of aggregation of simplexes introduced in I [Sci. Rep., 8:1987, 2018], here we study topological and spectral properties of a large class of self-assembled structures consisting of monodisperse building blocks (cliques of size n=3,4,5,6) which self-assemble via sharing the geometrical shapes of a lower order. The size of the shared sub-structure is tunned by varying the chemical affinity such that for significant positive sharing the largest face is the most probable, while for < 0, attaching via a single node dominates. Our results reveal that, while the parameter of hyperbolicity remains δmax=1 across the assemblies, their structure and spectral dimension ds vary with the size of cliques n and the affinity when ≥ 0. In this range, we findthat ds >4 can be reached for n≥ 5 and sufficiently large . For the aggregates of triangles and tetrahedra, the spectral dimension remains in the range ds∈ [2,4), as well as for the higher cliques at vanishing affinity. On the other end, for < 0, we find ds 1.57 independently on n. Moreover, the spectral distribution of the normalised Laplacian eigenvalues has a characteristic shape with peaks and a pronounced minimum, representing the hierarchical architecture of the simplicial complexes. These findings show how the structures compatible with complex dynamical properties can be assembled by controlling the higher-order connectivity among the building blocks.