Structure and rheology of binary mixtures in shear flow

• Main Authors: Corberi, F, Gonnella, G, Lamura, A
• Format: Journal Article
• Language: English
• Published: 24.01.2000
• Subjects: Physics - Disordered Systems and Neural Networks; Physics - Materials Science; Physics - Mesoscale and Nanoscale Physics; Physics - Other Condensed Matter; Physics - Quantum Gases; Physics - Soft Condensed Matter; Physics - Statistical Mechanics; Physics - Strongly Correlated Electrons; Physics - Superconductivity
• DOI: 10.48550/arxiv.cond-mat/0001342

Phys. Rev. E 61, 6621 (2000) Results are presented for the phase separation process of a binary mixture subject to an uniform shear flow quenched from a disordered to a homogeneous ordered phase. The kinetics of the process is described in the context of the time-dependent Ginzburg-Landau equation with an external velocity term. The large-N approximation is used to study the evolution of the model in the presence of a stationary flow and in the case of an oscillating shear. For stationary flow we show that the structure factor obeys a generalized dynamical scaling. The domains grow with different typical lengthscales $R_x$ and $R_\perp$ respectively in the flow direction and perpendicularly to it. In the scaling regime $R_\perp \sim t^{\alpha_\perp}$ and $R_x \sim \gamma t^{\alpha_x}$ (with logarithmic corrections), $\gamma $ being the shear rate, with $\alpha_x=5/4$ and $\alpha_\perp =1/4$. The excess viscosity $\Delta \eta$ after reaching a maximum relaxes to zero as $\gamma ^{-2}t^{-3/2}$. $\Delta \eta$ and other observables exhibit log-time periodic oscillations which can be interpreted as due to a growth mechanism where stretching and break-up of domains cyclically occur. In the case of an oscillating shear a cross-over phenomenon is observed: Initially the evolution is characterized by the same growth exponents as for a stationary flow. For longer times the phase separating structure cannot align with the oscillating drift and a different regime is entered with an isotropic growth and the same exponents of the case without shear.