Your search keyword '"pacs:83.60.Df"' showing total 5 results

1. From equilibrium to steady-state dynamics after switch-on of shear

Author

Matthias Krüger, Fabian Weysser, and Thomas Voigtmann

Subjects

Physics, Speedup, Shear thinning, pacs:82.70.Dd, shear flow, pacs:05.70.Ln, FOS: Physical sciences, Non-equilibrium thermodynamics, pacs:83.60.Df, mode coupling theory, Condensed Matter - Soft Condensed Matter, Dissipation, transient dynamics, Stochastic dynamics, Shear (geology), Homogeneous, Soft Condensed Matter (cond-mat.soft), ddc:530, rheology, Statistical physics, Glass transition, pacs:64.70.P, Brownian dynamics computer simulation

Abstract

A relation between equilibrium, steady-state, and waiting-time dependent dynamical two-time correlation functions in dense glass-forming liquids subject to homogeneous steady shear flow is discussed. The systems under study show pronounced shear thinning, i.e., a significant speedup in their steady-state slow relaxation as compared to equilibrium. An approximate relation that recovers the exact limit for small waiting times is derived following the integration through transients (ITT) approach for the nonequilibrium Smoluchowski dynamics, and is exemplified within a schematic model in the framework of the mode-coupling theory of the glass transition (MCT). Computer simulation results for the tagged-particle density correlation functions corresponding to wave vectors in the shear-gradient directions from both event-driven stochastic dynamics of a two-dimensional hard-disk system and from previously published Newtonian-dynamics simulations of a three-dimensional soft-sphere mixture are analyzed and compared with the predictions of the ITT-based approximation. Good qualitative and semi-quantitative agreement is found. Furthermore, for short waiting times, the theoretical description of the waiting time dependence shows excellent quantitative agreement to the simulations. This confirms the accuracy of the central approximation used earlier to derive fluctuation dissipation ratios (Phys. Rev. Lett. 102, 135701). For intermediate waiting times, the correlation functions decay faster at long times than the stationary ones. This behavior is predicted by our theory and observed in simulations., Comment: 16 pages, 12 figures, submitted to Phys Rev E

Published

2010

2. Nonequilibrium fluctuation dissipation relations of interacting Brownian particles driven by shear

Author

Matthias Krüger and Matthias Fuchs

Subjects

Physics, Toy model, Smoluchowski coagulation equation, pacs:82.70.Dd, pacs:05.70.Ln, Probability current, FOS: Physical sciences, Non-equilibrium thermodynamics, Detailed balance, pacs:83.60.Df, Condensed Matter - Soft Condensed Matter, Condensed Matter::Disordered Systems and Neural Networks, Condensed Matter::Soft Condensed Matter, symbols.namesake, Classical mechanics, Mode coupling, symbols, Soft Condensed Matter (cond-mat.soft), ddc:530, Statistical physics, Stationary state, Brownian motion, pacs:64.70.P

Abstract

We present a detailed analysis of the fluctuation dissipation theorem (FDT) close to the glass transition in colloidal suspensions under steady shear using mode coupling approximations. Starting point is the many-particle Smoluchowski equation. Under shear, detailed balance is broken and the response functions in the stationary state are smaller at long times than estimated from the equilibrium FDT. An asymptotically constant relation connects response and fluctuations during the shear driven decay, restoring the form of the FDT with, however, a ratio different from the equilibrium one. At short times, the equilibrium FDT holds. We follow two independent approaches whose results are in qualitative agreement. To discuss the derived fluctuation dissipation ratios, we show an exact reformulation of the susceptibility which contains not the full Smoluchowski operator as in equilibrium, but only its well defined Hermitian part. This Hermitian part can be interpreted as governing the dynamics in the frame comoving with the probability current. We present a simple toy model which illustrates the FDT violation in the sheared colloidal system., 21 pages, 13 figures, submitted to Phys. Rev. E

Published

2009

3. Fluctuation dissipation relations in stationary states of interacting Brownian particles under shear

Author

Matthias Krüger and Matthias Fuchs

Subjects

Physics, Fluctuation-dissipation theorem, pacs:82.70.Dd, Smoluchowski coagulation equation, Fluctuation theorem, pacs:05.70.Ln, General Physics and Astronomy, FOS: Physical sciences, pacs:83.60.Df, Detailed balance, Condensed Matter - Soft Condensed Matter, Dissipation, Condensed Matter::Disordered Systems and Neural Networks, Condensed Matter::Soft Condensed Matter, symbols.namesake, Classical mechanics, Shear (geology), symbols, Soft Condensed Matter (cond-mat.soft), ddc:530, pacs:64.70.P, Brownian motion, Stationary state

Abstract

The fluctuation dissipation theorem (FDT) is studied close to the glass transition in colloidal suspensions under steady shear. Shear breaks detailed balance in the many-particle Smoluchowski equation, and gives response functions in the stationary state which are smaller at long times than estimated from the equilibrium FDT. During the final shear-driven decay, an asymptotically constant relation connects response and fluctuations, restoring the form of the FDT with, however, a ratio different from the equilibrium one., Comment: accepted to Phys. Rev. Lett.

Published

2009

4. Dense colloidal suspensions under time-dependent shear

Author

Michael E. Cates, Joseph M. Brader, Matthias Fuchs, and Thomas Voigtmann

Subjects

Shearing (physics), Physics, Statistical Mechanics (cond-mat.stat-mech), pacs:82.70.Dd, Smoluchowski coagulation equation, FOS: Physical sciences, General Physics and Astronomy, pacs:83.60.Df, Condensed Matter - Soft Condensed Matter, Shear modulus, Simple shear, Shear rate, Physics::Fluid Dynamics, Condensed Matter::Soft Condensed Matter, symbols.namesake, Classical mechanics, pacs:83.10.Gr, Generalized Newtonian fluid, pacs:64.70.Pf, Shear stress, symbols, Soft Condensed Matter (cond-mat.soft), ddc:530, Shear flow, Condensed Matter - Statistical Mechanics

Abstract

We consider the nonlinear rheology of dense colloidal suspensions under a time-dependent simple shear flow. Starting from the Smoluchowski equation for interacting Brownian particles advected by shearing (ignoring fluctuations in fluid velocity) we develop a formalism which enables the calculation of time-dependent, far-from-equilibrium averages. Taking shear-stress as an example we derive exactly a generalized Green-Kubo relation, and an equation of motion for the transient density correlator, involving a three-time memory function. Mode coupling approximations give a closed constitutive equation yielding the time-dependent stress for arbitrary shear rate history. We solve this equation numerically for the special case of a hard sphere glass subject to step-strain., 4 pages

Published

2006

5. Yield stress discontinuity in a simple glass

Author

Oliver Henrich and Fathollah Varnik

Subjects

Physics, Condensed matter physics, Statistical Mechanics (cond-mat.stat-mech), pacs:05.70.Ln, Sigma, Thermodynamics, FOS: Physical sciences, pacs:83.60.Fg, pacs:83.60.Df, Condensed Matter - Soft Condensed Matter, Condensed Matter Physics, Electronic, Optical and Magnetic Materials, Shear rate, Condensed Matter::Soft Condensed Matter, Shear stress, pacs:64.70.Pf, Soft Condensed Matter (cond-mat.soft), ddc:530, Supercooling, Condensed Matter - Statistical Mechanics

Abstract

Large scale molecular dynamics simulations are performed to study the steady state yielding dynamics of a well established simple glass. In contrast to the supercooled state, where the shear stress, $\sigma$, tends to zero at vanishing shear rate, $\gammadot$, a stress plateau forms in the glass which extends over about two decades in shear rate. This strongly suggests the existence of a finite dynamic yield stress in the glass, $\sigma^+ (T) \equiv \sigma(T; \gammadot \to 0) >0$. Furthermore, the temperature dependence of $\sigma^+$ suggests a yield stress discontinuity at the glass transition in agreement with recent theoretical predictions. We scrutinize and support this observation by testing explicitly for the assumptions (affine flow, absence of flow induced ordering) inherent in the theory. Also, a qualitative change of the flow curves enables us to bracket the glass transition temperature $T_c$ of the theory from above and (for the first time in simulations) {\it from below}. Furthermore, the structural relaxation time in the steady state behaves quite similar to the system viscosity at all studied shear rates and temperatures., Comment: 4 pages, 5 figures

Published

2006