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| struct | DisplacementGradient |
| | A struct computing the value, first and second derivatives of the Green-Lagrange strain tensor (in Voigt notation), where the displacement gradient is enhanced. More...
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| struct | DisplacementGradientTransposed |
| | A struct computing the value, first and second derivatives of the Green-Lagrange strain tensor (in Voigt notation), where the transpose of the displacement gradient (pre-multiplied with deformation gradient at the center of the element) is enhanced. More...
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| struct | E0 |
| | Dummy struct for displacement-based EAS elements, i.e. 0 enhanced modes. More...
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| struct | E11 |
| | Structure representing EAS for Q2 with 11 enhanced strains. More...
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| struct | E21 |
| | Structure representing EAS for H1 with 21 enhanced strains. More...
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| struct | E4 |
| | E4 structure for EAS with linear strains and 4 enhanced modes. More...
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| struct | E5 |
| | Structure representing EAS for Q1 with 5 enhanced strains. More...
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| struct | E7 |
| | Structure representing EAS for Q1 with 7 enhanced strains. More...
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| struct | E9 |
| | Structure representing EAS for H1 with 9 enhanced strains. More...
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| struct | EASVariant |
| | Wrapper around the EAS variant, contains helper functions. More...
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| struct | EX |
| | Interface for displacement-based EAS elements, where linear or Green-Lagrange strains are enhanced. More...
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| struct | GreenLagrangeStrain |
| | A struct computing the value, first and second derivatives of the Green-Lagrange strain tensor (in Voigt notation), where the Green-Lagrange strain itself is enhanced. More...
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| struct | H0 |
| | Dummy struct for displacement-based EAS elements, i.e. 0 enhanced modes, where displacement gradient is enhanced. More...
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| struct | H4 |
| | H4 struct for EAS with 4 enhanced modes. More...
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| struct | H9 |
| | H9 struct for EAS with 9 enhanced modes. More...
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| struct | HX |
| | Interface for displacement-based EAS elements, where displacement gradient is enhanced. More...
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| struct | LinearStrain |
| | A struct computing the value, first and second derivatives of the linear strain tensor (in Voigt notation), where the linear strain itself is enhanced. More...
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1.9.4