Difference between revisions of "Shear"

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==Keyword in References==
==Keyword in References==
[[An active biopolymer network controlled by molecular motors]]
[[Homogeneous flow of metallic glasses: A free volume perspective]]
[[Homogeneous flow of metallic glasses: A free volume perspective]]

Latest revision as of 06:35, 3 December 2011

Figure 1, taken from reference [1]

To shear something is to cause a shear strain, by application of a shear stress. Recall that the shear stress σ is given by the applied force F over the area A, namely

<math>\sigma = \frac{F}{A}</math> ,

and the shear strain <math>\gamma</math> is given by

<math>\gamma = \frac{\Delta x}{y}</math> .

See Figure 1 for clarification.

Shear melting

Particle motion diagram from Eisenmann paper.
Figure 2, from Eisenmann et al. Dynamic clusters for a low volume fraction liquid (a) and a sheared glass (b). Full circles represent particle initial positions and open circles are final positions after a shear strain <math>\gamma = 0.15</math>. Red/blue: moving in +/- y-direction. Green/orange: moving in +/- x-direction. Shear is in the y-direction.

When shear is applied to a colloidal suspension, it causes the particles to flow relative to each other. This phenomenon, unique to colloidal systems, is called shear melting and is a topic of recent research.

In 2009, Eisenmann et al investigated the phase transition between diffusive and non-diffusive behavior near a specific shear strain that is necessary to produce shear melting of a colloidal glass. They found that diffusive behavior and homogeneous particle motion can be observed for shear strains beyond <math>\gamma \approx 0.08</math> . For larger strains, they summarized, "the applied shear drives diffusive behavior."

It can also be demonstrated that an effective diffusion coefficient can be found if the thermal energy in the Stokes-Einstein equation is replaced with "shear energy". The result is that in a shear melted colloid glass, the diffusion coefficient is proportional to the shear-rate <math>\dot{\gamma}</math>. This diffusion coefficient also depends on the average size of the clusters of particles which move together under shear. Evidence of the existence of these clusters came from the data shown in Figure 2.


[1] R. Jones, "Soft Condensed Matter," Oxford University Press Inc., New York (2002).

[2] C. Eisenmann et al. "Shear melting of a colloidal glass," Harvard University, Cambridge, MA (preprint, 2009). [1]

[3] http://en.wikipedia.org/wiki/Shearing_%28physics%29

Keyword in References

An active biopolymer network controlled by molecular motors

Homogeneous flow of metallic glasses: A free volume perspective