On inequalities of shear modulus contributions in disordered elastic bodies

Abstract

We investigate generic inequalities of various contributions to the shear modulus μ in ensembles of amorphous elastic bodies. We focus first on a simple elastic network model with connectivity matrices (CMs) which are either annealed or quenched, at or out of equilibrium. The stress-fluctuation formalism relation for μ is rewritten as μ = μ1 + μa with μ1 0 characterizing the variance of the quenched shear stresses and μa being a simple average over all states and CMs. For equilibrium CM-distributions μa becomes equivalent to the shear modulus of annealed systems, i.e. μa 0, while more generally μa may become strongly negative as shown by considering a temperature quench and a scalar active two-temperature model. Consistent relations are also found for glass-forming colloids where μ-μ1=μa=0 for equilibrium ensembles, i.e. μ is set by the quenched shear stresses, while μa becomes again negative otherwise.

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