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Template:Lowercase Template:Continuum mechanics The von Mises yield criterion[1] suggests that the yielding of materials begins when the second deviatoric stress invariant J2 reaches a critical value. For this reason, it is sometimes called the J2-plasticity or J2 flow theory. It is part of a plasticity theory that applies best to ductile materials, such as metals. Prior to yield, material response is assumed to be elastic.

In materials science and engineering the von Mises yield criterion can be also formulated in terms of the von Mises stress or equivalent tensile stress, σv, a scalar stress value that can be computed from the Cauchy stress tensor. In this case, a material is said to start yielding when its von Mises stress reaches a critical value known as the yield strength, σy. The von Mises stress is used to predict yielding of materials under any loading condition from results of simple uniaxial tensile tests. The von Mises stress satisfies the property that two stress states with equal distortion energy have equal von Mises stress.

Because the von Mises yield criterion is independent of the first stress invariant, I1, it is applicable for the analysis of plastic deformation for ductile materials such as metals, as the onset of yield for these materials does not depend on the hydrostatic component of the stress tensor.

Although formulated by Maxwell in 1865, it is generally attributed to Richard Edler von Mises (1913).[2] Tytus Maksymilian Huber (1904), in a paper in Polish, anticipated to some extent this criterion.[3] This criterion is also referred to as the MaxwellHuberHencky–von Mises theory.

Mathematical formulation

The von Mises yield surfaces in principal stress coordinates circumscribes a cylinder with radius 23σy around the hydrostatic axis. Also shown is Tresca's hexagonal yield surface.

Mathematically the von Mises yield criterion is expressed as:

J2=k2

where k is the yield stress of the material in pure shear. As shown later in this article, at the onset of yielding, the magnitude of the shear yield stress in pure shear is √3 times lower than the tensile yield stress in the case of simple tension. Thus, we have:

k=σy3

where σy is the yield strength of the material. If we set the von Mises stress equal to the yield strength and combine the above equations, the von Mises yield criterion can be expressed as:

σv=σy=3J2

or

σv2=3J2=3k2

Substituting J2 with terms of the Cauchy stress tensor components

σv2=12[(σ11σ22)2+(σ22σ33)2+(σ11σ33)2+6(σ232+σ312+σ122)]

This equation defines the yield surface as a circular cylinder (See Figure) whose yield curve, or intersection with the deviatoric plane, is a circle with radius 2k, or 23σy. This implies that the yield condition is independent of hydrostatic stresses.

Reduced von Mises equation for different stress conditions

Intersection of the von Mises yield criterion with the σ1,σ2 plane, where σ3=0

The above equation can be reduced and reorganized for practical use in different loading scenarios.

In the case of uniaxial stress or simple tension, σ10,σ3=σ2=0, the von Mises criterion simply reduces to

σ1=σy,

which means the material starts to yield when σ1 reaches the yield strength of the material σy, and is in agreement with the definition of tensile (or compressive) yield strength.

It is also convenient to define an Equivalent tensile stress or von Mises stress, σv, which is used to predict yielding of materials under multiaxial loading conditions using results from simple uniaxial tensile tests. Thus, we define

σv=3J2=(σ11σ22)2+(σ22σ33)2+(σ11σ33)2+6(σ122+σ232+σ312)2=(σ1σ2)2+(σ2σ3)2+(σ1σ3)22=32sijsij

where sij are the components of the stress deviator tensor 𝝈dev:

𝝈dev=𝝈13(tr 𝝈)𝐈.

In this case, yielding occurs when the equivalent stress, σv, reaches the yield strength of the material in simple tension, σy. As an example, the stress state of a steel beam in compression differs from the stress state of a steel axle under torsion, even if both specimens are of the same material. In view of the stress tensor, which fully describes the stress state, this difference manifests in six degrees of freedom, because the stress tensor has six independent components. Therefore, it is difficult to tell which of the two specimens is closer to the yield point or has even reached it. However, by means of the von Mises yield criterion, which depends solely on the value of the scalar von Mises stress, i.e., one degree of freedom, this comparison is straightforward: A larger von Mises value implies that the material is closer to the yield point.

In the case of pure shear stress, σ12=σ210, while all other σij=0, von Mises criterion becomes:

σ12=k=σy3.

This means that, at the onset of yielding, the magnitude of the shear stress in pure shear is 3 times lower than the tensile stress in the case of simple tension. The von Mises yield criterion for pure shear stress, expressed in principal stresses, is

(σ1σ2)2+(σ2σ3)2+(σ1σ3)2=6σ122

In the case of plane stress, σ3=0, the von Mises criterion becomes:

σ12σ1σ2+σ22=3k2=σy2

This equation represents an ellipse in the plane σ1σ2, as shown in the Figure above.

The following table summarizes von Mises yield criterion for the different stress conditions.

Load scenario Restrictions Simplified von Mises equation
General No restrictions σv=12[(σ11σ22)2+(σ22σ33)2+(σ33σ11)2+6(σ122+σ232+σ312)]
Principal stresses σ12=σ13=σ23=0 σv=12[(σ1σ2)2+(σ1σ3)2+(σ2σ3)2]
Plane stress σ3=0

σ31=σ23=0

σv=σ12σ1σ2+σ22
Pure shear σ1=σ2=σ3=0

σ31=σ23=0

σv=3|σ12|
Uniaxial σ2=σ3=0

σ12=σ31=σ23=0

σv=σ1

Notes:

  • subscripts 1,2,3 can be replaced with x,y,z, or other orthogonal coordinate system

Physical interpretation of the von Mises yield criterion

Hencky (1924) offered a physical interpretation of von Mises criterion suggesting that yielding begins when the elastic energy of distortion reaches a critical value.[3] For this, the von Mises criterion is also known as the maximum distortion strain energy criterion. This comes from the relation between J2 and the elastic strain energy of distortion WD:

WD=J22G with the elastic shear modulus G=E2(1+ν).

In 1937 [4] Arpad L. Nadai suggested that yielding begins when the octahedral shear stress reaches a critical value, i.e. the octahedral shear stress of the material at yield in simple tension. In this case, the von Mises yield criterion is also known as the maximum octahedral shear stress criterion in view of the direct proportionality that exists between J2 and the octahedral shear stress, τoct, which by definition is

τoct=23J2

thus we have

τoct=23σy

Comparison with Tresca yield criterion

Also shown in the figure is Tresca's maximum shear stress criterion (dashed line). Observe that Tresca's yield surface is circumscribed by von Mises's. Therefore, it predicts plastic yielding already for stress states that are still elastic according to the von Mises criterion. As a model for plastic material behavior, Tresca's criterion is therefore more conservative.

See also

References

  1. von Mises, R. (1913). Mechanik der festen Körper im plastisch deformablen Zustand. Göttin. Nachr. Math. Phys., vol. 1, pp. 582–592.
  2. Ford, Advanced Mechanics of Materials, Longmans, London, 1963
  3. 3.0 3.1 Hill, R. (1950). The Mathematical Theory of Plasticity. Oxford, Clarendon Press
  4. S. M. A. Kazimi. (1982). Solid Mechanics. Tata McGraw-Hill. ISBN 0-07-451715-5

5. M. Huber, Specific work of strain as a measure of material effort, Towarzystwo Politechniczne, "Czas. Techniczne", Lwów, 1903.