1-5 of 5
Keywords: shear deformation
Close
Follow your search
Access your saved searches in your account

Would you like to receive an alert when new items match your search?
Close Modal
Sort by
Journal Articles
Article Type: Technical Briefs
J. Comput. Nonlinear Dynam. October 2010, 5(4): 044501.
Published Online: July 28, 2010
... a space curve that represents the element centerline. The frame defined by the rotations can differ from the Frenet frame of the space curve defined by the same rotation field and, therefore, such a rotation-based representation can provide measure of twist shear deformations and captures the rotation...
Journal Articles
Article Type: Research Papers
J. Comput. Nonlinear Dynam. April 2010, 5(2): 021009.
Published Online: February 19, 2010
... analysis shear deformation vibrations shooting nonlinear curved beam subharmonic modal participation Studies on curved beams and arches as classical problems of vibration and stability have attracted the attention of many researchers due to their practical importance. Most...
Journal Articles
Article Type: Research Papers
J. Comput. Nonlinear Dynam. January 2009, 4(1): 011004.
Published Online: November 11, 2008
...Aki Mikkola; Oleg Dmitrochenko; Marko Matikainen In this study, a procedure to account for transverse shear deformation in the absolute nodal coordinate formulation is presented. In the absolute nodal coordinate formulation, shear deformation is usually defined by employing the slope vectors...
Journal Articles
Article Type: Research Papers
J. Comput. Nonlinear Dynam. October 2008, 3(4): 041012.
Published Online: September 4, 2008
... 2007 26 11 2007 04 09 2008 plates (structures) shear deformation The description of flexible bodies that experience large deformations in multibody applications is a challenging task that can be accomplished using formulations that are based on the finite element approach. One...
Journal Articles
Article Type: Research Papers
J. Comput. Nonlinear Dynam. April 2007, 2(2): 146–154.
Published Online: November 17, 2006
... general Timoshenko beam theory the rigid cross section is permitted to rotate due to the shear deformation, and as a result, the cross section can have an arbitrary rotation with respect to the beam centerline. In more general beam models as the ones based on the absolute nodal coordinate formulation...