Biaxial tensile testing: Difference between revisions

Biaxial tensile testing is a versatile technique to address the mechanical characterization of planar materials. Typical materials tested in biaxial configuration include metal sheets,^[1] silicone elastomers,^[2] composites,^[3] thin films,^[4] textiles ^[5] and biological soft tissues.^[6]

An example of a biaxial tensile machine.

Purposes of biaxial tensile testing

A biaxial tensile test generally allows the assessment of the mechanical properties ^[7] and a complete characterization for uncompressible isotropic materials, which can be obtained through a fewer amount of specimens with respect to uniaxial tensile tests. ^[8] Biaxial tensile testing is particularly suitable for understanding the mechanical properties of biomaterials, due to their directionally oriented microstructures.^[6] If the testing aims at the material characterization of the post elastic behaviour, the uniaxial results become inadequate, and a biaxial test is required in order to examine the plastic behaviour. ^[5] In addition to this, using uniaxial test results to predict rupture under biaxial stress states seems to be inadequate. ^{[9] [10]}

Even if a biaxial tensile test is performed in a planar configuration, it may be equivalent to the stress state applied on three-dimensional geometries, such as cylinders with an inner pressure and an axial stretching. ^[11] The relationship between the inner pressure and the circumferential stress is given by the Mariotte formula:

${\displaystyle \sigma _{c}={\frac {PD}{2t}}}$

where ${\displaystyle \sigma _{c}}$ is the circumferential stress, P the inner pressure, D the inner diameter and t the wall thickness of the tube.

Equipment

Typically, a biaxial tensile machine is equipped with motor stages, two load cells and a gripping system.

Motor stages

Through the movement of the motor stages a certain displacement is applied on the material sample. If the motor stage is one, the displacement is the same in the two direction and only the equi-biaxial state is allowed. On the other hand, by using four independent motor stages, any load condition is allowed; this feature makes the biaxial tensile test superior to other tests that may apply a biaxial tensile state, such as the hydaulic bulge, semispherical bulge, stack compression or flat punch. ^[12] Using four independent motor stages allows to keep the sample centred during the whole duration of the test; this feature is particularly useful to couple an image analysis during the mechanical test. The most common way to obtain the fields of displacements and strains is the Digital Image Correlation (DIC),^[12] which is a contactless technique and so very useful since it doesn't affect the mechanical results. ^[13]

Load cells

Two load cells are placed along the two orthogonal load directions to measure the normal reaction forces explicated by the specimen. The dimensions of the sample have to be in accordance with the resolution and the full scale of the load cells.

A biaxial tensile test can be performed either in a load-controlled condition, or a displacement-controlled condition, in accordance with the settings of the biaxial tensile machine. In the former configuration a constant loading rate is applied and the displacements are measured, whereas in the latter configuration a constant displacement rate is applied and the forces are measured.

Dealing with elastic materials the load history is not relevant, whereas in viscoelastic materials it is not negligible. Furthermore, for this class of materials also the loading rate plays a role. ^[14]

Gripping system

The gripping system transfers the load from the motor stages to the specimen. Although the use of biaxial tensile testing is growing more and more, there is still a lack of robust standardized protocols concerning the gripping system. Since it plays a fundamental role in the application and distribution of the load, the gripping system has to be carefully designed in order to satisfy the Saint-Venant principle. ^[15] Some different gripping systems are reported below.

Clamps

The clamps are the most common used gripping system for biaxial tensile test since they allow a quite uniformly distributed load at the junction with the sample. ^[15] To increase the uniformity of stress in the region of the sample close to the clamps, some notches with circular tips are obtained from the arm of the sample. ^[16] The main problem related with the clamps is the low friction at the interface with the sample; indeed, if the friction between the inner surface of the clamps and the sample is too low, there could be a relative motion between the two systems altering the results of the test.

Sutures

Small holes are performed on the surface on the sample to connect it to the motor stages through wire with a stiffness much higher than the sample. Typically, sutures are used with square samples. In contrast to the clamps, sutures allow the rotation of the sample around the axis perpendicular to the plane; in this way they do not allow the transmission of shear stresses to the sample. ^[15] The load transmission is very local, thereby the load distribution is not uniform. A template is needed to apply the sutures in the same position in different samples, to have repeatability among different tests.

Rakes

This system is similar to the suture gripping system, but stiffer. The rakes transfer a limited quantity of shear stress, so they are less useful than sutures if used in presence of large shear strains. Although the load is transmitted in a discontinuous way, the load distribution is more uniform if compared to the sutures. ^[15]

Specimen shape

The success of a biaxial tensile test is strictly related to the shape of the specimen. ^[17] The two most used geometries are the square and cruciform shapes. Dealing with fibrous materials or fibres reinforced composites, the fibres should be aligned to the load directions for both classes of specimens, in order to minimize the shear stresses and to avoid the sample rotation.^[15]

Two different designs of cruciform specimens for biaxial tensile tests. These two shapes differ for the fillet radii, the length of the arms and the internal area subjected to a biaxial tensile state. As only the central area of the specimen is subjected to a biaxial tensile state, the analysis is restricted to only a small part of the whole specimen.

Square samples

Square or more generally rectangular specimens are easy to obtain, and their dimension and ratio depend on the material availability. Large specimens are needed to make negligible the effects of the gripping system in the core of the sample. However this solution is very material consuming so small specimen are required. Since the gripping system is very close to the core of the specimen the strain distribution is not homogeneous. ^{[18] [19]}

Cruciform samples

A proper cruciform sample should fulfil the following requirements: ^{[20] [21]}

• maximisation of the biaxially loaded area in the centre of the sample, where the strain field is uniform;
• minimization of the shear strain in the centre of the sample;
• minimization of regions of stress concentration, even outside the area of interest;
• failure in the biaxially loaded area;
• repeatable results.

Is important to note that on this kind of sample, the stretch is larger in the outer region than in the centre, where the strain is uniform.^[16]

Analytical solution

A biaxial tensile state can be derived starting from the most general constitutive law for isotropic materials in large strains regime:

${\displaystyle {\mathbf {S}}=2(W_{1}{\mathbf {I}}+W_{2}(I_{1}^{C}{\mathbf {I}}-{\mathbf {C}})+W_{3}I_{3}^{C}{\mathbf {C}}^{-1})}$

where S is the second Piola-Kirchhoff stress tensor, I the identity matrix, C the right Cauchy-Green tensor, and ${\displaystyle W_{1}={\frac {\partial W_{0}}{\partial I_{1}^{C}}}}$, ${\displaystyle W_{2}={\frac {\partial W_{0}}{\partial I_{2}^{C}}}}$ and ${\displaystyle W_{3}={\frac {\partial W_{0}}{\partial I_{3}^{C}}}}$ the derivatives of the strain energy function per unit of volume in the undeformed configuration ${\displaystyle W_{0}}$ with respect to the three invariants of C.

For an uncompressible material, the previous equation becomes:

${\displaystyle {\mathbf {S}}=2(W_{1}{\mathbf {I}}+W_{2}(I_{1}^{C}{\mathbf {I}}-{\mathbf {C}}))-p{\mathbf {C}}^{-1}}$

where p is of hydrostatic nature and plays the role of a Lagrange multiplier. It is worth nothing that p is not the hydrostatic pressure and must be determined independently of constitutive model of the material.

A well-posed problem requires specifying ${\displaystyle S_{33}}$; for a biaxial state of a membrane ${\displaystyle S_{33}=0}$, thereby the p term can be obtained

${\displaystyle p=2C_{33}(W_{1}+W_{2}(I_{1}^{C}-C_{33}))}$

where ${\displaystyle C_{33}}$ is the third component of the diagonal of C.

According to the definition, the three non zero components of the deformation gradient tensor F are ${\displaystyle F_{11}=\lambda _{11}}$, ${\displaystyle F_{22}=\lambda _{22}}$ and ${\displaystyle F_{33}={\frac {1}{\lambda _{11}\lambda _{22}}}}$.

Consequently, the components of C can be calculated with the formula ${\displaystyle {\mathbf {C}}={\mathbf {F}}^{T}{\mathbf {F}}}$, and they are ${\displaystyle C_{11}=\lambda _{11}^{2}}$, ${\displaystyle C_{22}=\lambda _{22}^{2}}$ and ${\displaystyle C_{33}={\frac {1}{\lambda _{11}^{2}\lambda _{22}^{2}}}}$.

According with this stress state, the two non zero components of the second Piola-Kirchhoff stress tensor are:

${\displaystyle S_{11}=2W_{1}(1-{\frac {1}{\lambda _{11}^{4}\lambda _{22}^{2}}})+2W_{2}(\lambda _{22}^{2}-{\frac {1}{\lambda _{11}^{4}}})}$

${\displaystyle S_{22}=2W_{1}(1-{\frac {1}{\lambda _{11}^{2}\lambda _{22}^{4}}})+2W_{2}(\lambda _{11}^{2}-{\frac {1}{\lambda _{22}^{4}}})}$

By using the relationship between the second Piola-Kirchhoff and the Cauchy stress tensor, ${\displaystyle \sigma _{11}}$ and ${\displaystyle \sigma _{22}}$ can be calculated:

${\displaystyle \sigma _{11}=2W_{1}(\lambda _{11}^{2}-{\frac {1}{\lambda _{11}^{2}\lambda _{22}^{2}}})+2W_{2}(\lambda _{11}^{2}\lambda _{22}^{2}-{\frac {1}{\lambda _{11}^{2}}})}$

${\displaystyle \sigma _{22}=2W_{1}(\lambda _{22}^{2}-{\frac {1}{\lambda _{11}^{2}\lambda _{22}^{2}}})+2W_{2}(\lambda _{11}^{2}\lambda _{22}^{2}-{\frac {1}{\lambda _{22}^{2}}})}$

Equi-biaxial configuration

The simplest biaxial configuration is the equi-biaxial configuration, where each of the two direction of load are subjected to the same stretch at the same rate. In an uncompressible isotropic material under a biaxial stress state, the non zero components of the deformation gradient tensor F are ${\displaystyle F_{11}=F_{22}=\lambda }$ and ${\displaystyle F_{33}={\frac {1}{\lambda ^{2}}}}$.

According to the definition of C, its non zero components are ${\displaystyle C_{11}=C_{22}=\lambda ^{2}}$ and ${\displaystyle C_{33}={\frac {1}{\lambda ^{4}}}}$.

${\displaystyle S_{11}=S_{22}=2W_{1}(1-{\frac {1}{\lambda ^{6}}})+2W_{2}(\lambda ^{2}-{\frac {1}{\lambda ^{4}}})}$

The Cauchy stress in the two directions is:

${\displaystyle \sigma _{11}=\sigma _{22}=2W_{1}(\lambda ^{2}-{\frac {1}{\lambda ^{4}}})+2W_{2}(\lambda ^{4}-{\frac {1}{\lambda ^{2}}})}$

Strip biaxial configuration

Stress-stretch behaviour of a hyperelastic material in a strip biaxial configuration

A strip biaxial test is a test configuration where the stretch of one direction is confined, namely there is a zero displacement applied on that direction. The components of the C tensor become ${\displaystyle C_{11}=\lambda ^{2}}$, ${\displaystyle C_{22}=1}$ and ${\displaystyle C_{33}={\frac {1}{\lambda ^{2}}}}$. It is worth nothing that even if there is no displacement along the direction 2, the stress is different from zero and it is dependent on the stretch applied on the orthogonal direction, as stated in the following equations:

${\displaystyle S_{11}=2W_{1}(1-{\frac {1}{\lambda ^{4}}})+2W_{2}(1-{\frac {1}{\lambda ^{4}}})}$

${\displaystyle S_{22}=2W_{1}(1-{\frac {1}{\lambda ^{2}}})+2W_{2}(\lambda ^{2}-1)}$

The Cauchy stress in the two directions is:

${\displaystyle \sigma _{11}=2W_{1}(\lambda ^{2}-{\frac {1}{\lambda ^{2}}})+2W_{2}(\lambda ^{2}-{\frac {1}{\lambda ^{2}}})}$

${\displaystyle \sigma _{22}=2W_{1}(\lambda ^{2}-1)+2W_{2}(\lambda ^{4}-\lambda ^{2})}$

The strip biaxial test has been used in different applications, such as the prediction of the behaviour of orthotropic materials under a uniaxial tensile stress, ^[22] delamination problems, ^[23] and failure analysis. ^[24]

FEM analysis

Finite Element Methods (FEM) are often used to obtain the material parameters. ^{[25] [26] [27]} The procedure consists of reproducing the experimental test and obtain the same stress-stretch behaviour; to do so, an iterative procedure is needed to calibrate the constitutive parameters. This kind of approach has been demonstrated to be effective to obtain the stress-stretch relationship for a wide class of hyperelastic material models (Ogden, Neo-Hooke, Yeoh, and Mooney-Rivlin).^[16]

Standards

• ISO 16842:2014 metallic materials - sheet and strip - biaxial tensile testing method using a cruciform test piece.
• ISO 16808:2014 metallic materials - sheet and strip - determination of biaxial stress-strain curve by means of bulge test with optical measuring systems.
• ASTM D5617 - 04(2015) - Standard Test Method for Multi-Axial Tension Test for Geosynthetics.

See also

• Tensile testing
• Mechanical properties

References

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