Difference between revisions of "Cubic Traction Law"

From OSUPDOCS
Jump to navigation Jump to search
Line 23: Line 23:
These relations assume J<sub>Ic</sub> in J/m<sup>2</sup>, &sigma; in [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]], and &delta;<sub>c</sub> in [[ConsistentUnits Command#Legacy and Consistent Units|length units]].
These relations assume J<sub>Ic</sub> in J/m<sup>2</sup>, &sigma; in [[ConsistentUnits Command#Legacy and Consistent Units|pressure units]], and &delta;<sub>c</sub> in [[ConsistentUnits Command#Legacy and Consistent Units|length units]].


Besides specifying area and toughness properties, the cubic traction law has no other adjustable parameters. The initial slope and peak location of give once the area is specified. Thus unlike most other [[Traction Laws|traction laws]], this law has fewer parameters, which can be helpful when studying role of traction law on failure simulations.
Besides specifying area and toughness properties, the cubic traction law has no other adjustable parameters. The initial slope and peak location are given once the area is specified. Thus unlike most other [[Traction Laws|traction laws]], this law has fewer parameters, which can be helpful when studying role of traction laws on failure simulations.


== Failure ==
== Failure ==

Revision as of 11:01, 8 January 2020

The Traction Law

Cubictraction.jpg

This traction law assumes use a cubic function for traction as a function of crack opending displacement (COD). This cubic relation is choosen such that the slope is zero at δc and the peak always occurs at δc. This traction law was first proposed by Needleman. It has a convenient smooth shape for numerical calculations and the zero slope at δc may be desirable. There is no physical basis to claim it is more realistic than other traction laws. The resulting function is

      [math]\displaystyle{ \sigma = {27\over 4}\sigma_{max} {\delta\over\delta_c}\left(1-{\delta\over\delta_c}\right)^2 }[/math]

There are separate traction laws for opening displacement (mode I) and sliding displacement (mode II).

The toughness of this traction law is the area under the curve or:

      [math]\displaystyle{ J_c = {9\over 16} \sigma\delta_c }[/math]

When creating this traction law, you have to enter exactly two of these failure properties for both mode I and mode II (i.e., two of JIc, σI, and δIc and two of JIIc, σII, and δIIc). Whichever property is not specified will be calculated from the two provided properties using one of the following relations:

      [math]\displaystyle{ \delta_c = {16J_c\over 9000\sigma}, \qquad \sigma = {16J_c\over 9000\delta_c}, \qquad {\rm or} \qquad J_c = {9000\over 16}\sigma\delta_c }[/math]

These relations assume JIc in J/m2, σ in pressure units, and δc in length units.

Besides specifying area and toughness properties, the cubic traction law has no other adjustable parameters. The initial slope and peak location are given once the area is specified. Thus unlike most other traction laws, this law has fewer parameters, which can be helpful when studying role of traction laws on failure simulations.

Failure

The failure criterion under pure more or possible mixed-mode conditions is identical to the one used in the triangular traction law.

Traction Law Properties

This traction law only needs the common traction law properties

Property Description Units Default
(other) Properties common to all traction laws varies varies