Difference between revisions of "Transversely Isotropic Failure Surface"
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== Introduction == | == Introduction == | ||
This [[Damage Initiation Laws|damage initiation law]] predicts failure in transversely isotropic materials. Because it deals with a specific material type, this law is only appropriate for [[Transversely Isotropic Softening Material| | This [[Damage Initiation Laws|damage initiation law]] predicts failure in transversely isotropic materials. Because it deals with a specific material type, this law is only appropriate for [[Transversely Isotropic Softening Material|TransIsoSoftening]] materials. | ||
== Failure Surface == | == Failure Surface == | ||
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This failure surface has five failure properties. First, are two tensile strengths <math>\sigma_A</math> and <math>\sigma_T</math>. The first tensile strength is for tensile loading in the axial direction. The second is for tensile failure in the isotropic plane, which occurs in the maximum normal stress direction in that plane. | This failure surface has five failure properties. First, are two tensile strengths <math>\sigma_A</math> and <math>\sigma_T</math>. The first tensile strength is for tensile loading in the axial direction. The second is for tensile failure in the isotropic plane, which occurs in the maximum normal stress direction in that plane. | ||
Second, are three shear strengths <math>\tau_A</math>, <math>\tau_T</math>, and <math>\tau_{RS}</math>. The first two shear strength are for failure at maximum shear stress in planes parallel to the axial direction. When failure occurs in such a plane, the | Second, are three shear strengths <math>\tau_A</math>, <math>\tau_T</math>, and <math>\tau_{RS}</math>. The first two shear strength are for failure at maximum shear stress in planes parallel to the axial direction. When failure occurs in such a plane, the resulting crack will either be parallel to the axial direction with normal in transverse direction (if <math>\tau_A < \tau_T</math>) or parallel to the transverse direction with normal in the axial direction (if <math>\tau_T< \tau_A</math>) . The last shear strength is for failure in the isotropic plane, which occurs in the maximum shear stress direction in that plane. | ||
== Damage Law Properties == | == Damage Law Properties == | ||
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! Property !! Description !! Units !! Default | ! Property !! Description !! Units !! Default | ||
|- | |- | ||
| sigmacA || Critical stress for failure in the axial direction || [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]] || infinite | | sigmacA || Critical stress for failure in the axial direction (output as <tt>sigcA</tt>) || [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]] || infinite | ||
|- | |||
| sigmac ||Critical transverse tensile strength for tensile failure in the isotropic plane (output as <tt>sigcT</tt>) || [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]] || infinite | |||
|- | |- | ||
| taucA || Critical shear stress for failure due to axial shear stress with failure parallel to the axial direction || [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]] || infinite | | taucA || Critical shear stress for failure due to axial shear stress with failure parallel to the axial direction || [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]] || infinite | ||
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| taucT || Critical shear stress for failure due to axial shear stress with failure through the axial direction || [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]] || infinite | | taucT || Critical shear stress for failure due to axial shear stress with failure through the axial direction || [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]] || infinite | ||
|- | |- | ||
| tauc ||Critical transverse shear stress for shear failure n the isotropic plane (output as <tt>taucRS</tt>) || [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]] || infinite | |||
| tauc ||Critical transverse shear stress for shear failure n the isotropic plane (output as taucRS) || [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]] || infinite | |||
|} | |} | ||
Notice this law has two axial shear strengths (<tt>taucA</tt> and <tt>taucT</tt>). Crack that form by shear are determined by minimum of taucA and taucT. Even though the maximum value is never used to initiate failure, it is still needed for damage evolution. For example, in wood, <tt>taucA</tt> is called "shear parallel strength," <tt>tauT</tt> is called "shear perpendicular strength," and <tt>tauc</tt> is called "rolling shear strength." For wood, <tt>tauT</tt> is much larger than <tt>taucA</tt>, which means shear failure is by shear cracks parallel to the wood fibers in the axial direction. But, if the wood initiates failure by tension parallel to the fibers and then is loaded in shear, the shear damage evolution will be determined by softening law based on <tt>tauT</tt>. | |||
Latest revision as of 20:16, 30 January 2023
Introduction
This damage initiation law predicts failure in transversely isotropic materials. Because it deals with a specific material type, this law is only appropriate for TransIsoSoftening materials.
Failure Surface
This failure surface has five failure properties. First, are two tensile strengths [math]\displaystyle{ \sigma_A }[/math] and [math]\displaystyle{ \sigma_T }[/math]. The first tensile strength is for tensile loading in the axial direction. The second is for tensile failure in the isotropic plane, which occurs in the maximum normal stress direction in that plane.
Second, are three shear strengths [math]\displaystyle{ \tau_A }[/math], [math]\displaystyle{ \tau_T }[/math], and [math]\displaystyle{ \tau_{RS} }[/math]. The first two shear strength are for failure at maximum shear stress in planes parallel to the axial direction. When failure occurs in such a plane, the resulting crack will either be parallel to the axial direction with normal in transverse direction (if [math]\displaystyle{ \tau_A \lt \tau_T }[/math]) or parallel to the transverse direction with normal in the axial direction (if [math]\displaystyle{ \tau_T\lt \tau_A }[/math]) . The last shear strength is for failure in the isotropic plane, which occurs in the maximum shear stress direction in that plane.
Damage Law Properties
The following table lists the input properties for this initiation law
| Property | Description | Units | Default |
|---|---|---|---|
| sigmacA | Critical stress for failure in the axial direction (output as sigcA) | pressure units | infinite |
| sigmac | Critical transverse tensile strength for tensile failure in the isotropic plane (output as sigcT) | pressure units | infinite |
| taucA | Critical shear stress for failure due to axial shear stress with failure parallel to the axial direction | pressure units | infinite |
| taucT | Critical shear stress for failure due to axial shear stress with failure through the axial direction | pressure units | infinite |
| tauc | Critical transverse shear stress for shear failure n the isotropic plane (output as taucRS) | pressure units | infinite |
Notice this law has two axial shear strengths (taucA and taucT). Crack that form by shear are determined by minimum of taucA and taucT. Even though the maximum value is never used to initiate failure, it is still needed for damage evolution. For example, in wood, taucA is called "shear parallel strength," tauT is called "shear perpendicular strength," and tauc is called "rolling shear strength." For wood, tauT is much larger than taucA, which means shear failure is by shear cracks parallel to the wood fibers in the axial direction. But, if the wood initiates failure by tension parallel to the fibers and then is loaded in shear, the shear damage evolution will be determined by softening law based on tauT.