Dynamical behavior of disordered spring networks

TL;DR

This paper investigates the complex rheological behavior of disordered spring networks near critical connectivity, revealing a universal power law scaling influenced by strain fluctuations and extending effective medium theory to describe these phenomena.

Contribution

It introduces a scaling relation linking rheology and strain fluctuations in disordered networks and extends dynamic effective medium theory to better predict their behavior.

Findings

Weak power law rheology with exponent 0.41 near criticality

Scaling relation between rheology and nonaffine strain fluctuations

Quantitative description of rheology using extended effective medium theory

Abstract

We study the dynamical rheology of spring networks with a percolation model constructed by bond dilution in a two-dimensional triangular lattice. Hydrodynamic interactions are implemented by a Stokesian viscous coupling between the network nodes and a uniformly deforming liquid. Our simulations show that in a critical connectivity regime, these systems display weak power law rheology in which the complex shear modulus scales with frequency as G^* ~ (i * omega)^Delta where Delta = 0.41, in discord with a mean field prediction of Delta = 1/2. The weak power law rheology in the critical regime can be understood from a simple scaling relation between the macroscopic rheology and the nonaffine strain fluctuations, which diverge with vanishing frequency for isostatic networks. We expand on a dynamic effective medium theory, showing that it quantitatively describes the rheology of a diluted triangular lattice far from isostaticity; although the EMT correctly predicts the scaling form for the rheology of near-isostatic networks, there remains a quantitative disparity due to the mean-field nature of the EMT. Surprisingly, by connecting this critical scaling of the rheology with that of the strain fluctuations, we find that the dynamical behavior of disordered spring networks is fully determined by the critical exponents that govern the behavior of elastic network in the absence of viscous interactions.