Stress relaxation

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Stress relaxation describes how polymers relieve stress under constant strain. Because they are viscoelastic, polymers behave in a nonlinear, non-Hookean fashion.[1] This nonlinearity is described by both stress relaxation and a phenomenon known as creep, which describes how polymers strain under constant stress.

a) Applied strain and b) induced stress as functions of time for a viscoelastic material.

Viscoelastic materials have the properties of both viscous and elastic materials and can be modeled by combining elements that represent these characteristics. One viscoelastic model, called the Maxwell model predicts behavior akin to a spring (elastic element) being in series with a dashpot (viscous element), while the Voigt model places these elements in parallel. Although the Maxwell model is good at predicting stress relaxation, it is fairly poor at predicting creep. On the other hand, the Voigt model is good at predicting creep but rather poor at predicting stress relaxation (see Viscoelasticity).

The following image shows the response of a Standard Linear Solid material to a constant stress, \sigma _{0}, over time from t_{0} to a later time t_{f}. For times greater than t_{f} the load is removed. The curvature of the model represent the effects of both creep and stress relaxation.

Stress relaxation calculations can differ for different materials:

To generalize, Obukhov uses power dependencies:[2]

\sigma (t)={\frac  {\sigma _{0}}{1-[1-(t/t*)(1^{{1-n}})]}}

where \sigma _{0} is the maximum stress at the time the loading was removed (t*), and n is a material parameter.

Vegener et al. use a power series to describe stress relaxation in polyamides:[2]

\sigma (t)=\sum _{{mn}}^{{}}{A_{{mn}}[\ln(1+t)]^{m}(\epsilon '_{0})^{n}}

To model stress relaxation in glass materials Dowvalter uses the following:[2]

\sigma (t)={\frac  {1}{b}}*log{{\frac  {10^{{\alpha }}(t-t_{n})+1}{10^{{\alpha }}(t-t_{n})-1}}} where \alpha is a material constant and b and t_{n} depend on processing conditions.

The following non-material parameters all affect stress relaxation in polymers :[2]

  • Magnitude of initial loading
  • Speed of loading
  • Temperature (isothermal vs non-isothermal conditions)
  • Loading medium
  • Friction and wear
  • Long-term storage

See also

References

  1. Meyers and Chawla. "Mechanical Behavior of Materials" (1999) ISBN 0-13-262817-1
  2. 2.0 2.1 2.2 2.3 T.M. Junisbekov. "Stress Relaxation in Viscoelastic Materials" (2003) ISBN 1-57808-258-7
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