Ronankeating
Dec20-11, 12:42 PM
hi,
I'm studying the book for elasticity theory and I stuck at one of the equation in that book, the stiffness matrix for elements(thin or thick plate) in bending is given in that form
ke= t∫∫BT*Db*B*det(J)dζdη+∫∫BT*Ds*B*det(J)dζdη
B is the strain matrix(5x12) where the inner products include the shape function and derivation of shape function regarding the ζ and η.
Db is the bending coefficient matrix (5x5) (scalar)
Ds is the shear coefficient matrix (5x5) (scalar)
det(J) is the determinant of Jacobian matrix (2x2)
and book suggests that the equation can be solved by carrying out the Gauss integration, with 2 Gauss points for 1st term and 1 Gauss point for 2nd term, in order to avoid the shear locking phenomenon.
The question is:
Since I know that shape function(Ni = 1/4(1 + ξ*ξi )(1 + η*ηi)) is bilinear of ζ and η. B matrix is 1st order bilinear, so BT*Db*B yieleds 2nd order. Form of det(J) is also ζ and η dependant. Multiplication of all of this terms will result in at least 3 order form of equation , is that really can be solved with Gauss integration?
Regards,
I'm studying the book for elasticity theory and I stuck at one of the equation in that book, the stiffness matrix for elements(thin or thick plate) in bending is given in that form
ke= t∫∫BT*Db*B*det(J)dζdη+∫∫BT*Ds*B*det(J)dζdη
B is the strain matrix(5x12) where the inner products include the shape function and derivation of shape function regarding the ζ and η.
Db is the bending coefficient matrix (5x5) (scalar)
Ds is the shear coefficient matrix (5x5) (scalar)
det(J) is the determinant of Jacobian matrix (2x2)
and book suggests that the equation can be solved by carrying out the Gauss integration, with 2 Gauss points for 1st term and 1 Gauss point for 2nd term, in order to avoid the shear locking phenomenon.
The question is:
Since I know that shape function(Ni = 1/4(1 + ξ*ξi )(1 + η*ηi)) is bilinear of ζ and η. B matrix is 1st order bilinear, so BT*Db*B yieleds 2nd order. Form of det(J) is also ζ and η dependant. Multiplication of all of this terms will result in at least 3 order form of equation , is that really can be solved with Gauss integration?
Regards,