Jeanne M. Peters scite author profile

SUMMARYSimple mixed models are developed for the geometrically nonlinear analysis of deep arches. A total Lagrangian description of the arch deformation is used and the analytical formulation is based on aform of the nonlinear deep arch theory with the effects of transverse shear deformation included. The fundamental unknowns consist of the six internal forces and generalized displacements of the arch, and the element characteristic arrays are obtained by using Hellinger-Reissner mixed variational principle. The polynomial interpolation functions used in approximating the forces are one degree lower than those used for approximating the displacements, and the forces are discontinuous at the interelement boundaries.The equivalence between the mixed models developed herein and displacement models based on reduced integration of both the transverse shear and extensional energy terms is discussed. The advantages of mixed models over equivalent displacement models are outlined. Numerical results are presented to demonstrate the high accuracy and effectiveness of the mixed models developed, and compare their performance with other mixed models reported in the literature.

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Three‐Dimensional Solutions for Initially Stressed Structural Sandwiches

Noor

1994

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Jeanne M. Peters

Reduced basis technique for nonlinear analysis of structures

Mixed models and reduced/selective integration displacement models for nonlinear analysis of curved beams

Three‐Dimensional Solutions for Initially Stressed Structural Sandwiches

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