Exact elasticity-based finite element for circular plates Academic Article

abstract

• 2016 Elsevier Ltd In this paper, a general elasticity solution for the axisymmetric bending of a linearly elastic annular plate is used to derive an exact finite element for such a plate. We start by formulating an interior plate problem by employing Saint Venant's principle so that edge effects do not appear in the plate. Then the elasticity solution to the formulated interior problem is presented in terms of mid-surface variables so that it takes a form similar to conventional engineering plate theories. By using the mid-surface variables, the exact finite element is developed both by force- and energy-based approaches. The central, non-standard feature of the interior solution, and the finite element based on it, is that the interior stresses of the plate act as surface tractions on the plate edges and contribute to the total potential energy of the plate. Finally, analytical and numerical examples are presented using the elasticity solution and the derived finite element.

authors

• Reddy, Junuthula

published proceedings

• COMPUTERS & STRUCTURES

author list (cited authors)

• Karttunen, A. T., von Hertzen, R., Reddy, J. N., & Romanoff, J.

citation count

• 9

complete list of authors

• Karttunen, Anssi T||von Hertzen, Raimo||Reddy, JN||Romanoff, Jani

publication date

• April 2017

publisher

• Elsevier  Publisher

published in

• Computers and Structures  Journal

keywords

• Bettis' Theorem
• Clapeyron's Theorem
• Finite Element
• Interior Plate
• Numerical Examples
• Saint Venant's Principle

Digital Object Identifier (DOI)

• 10.1016/j.compstruc.2016.11.013

start page

• 219

end page

• 226

volume

• 182

URL

• http%3A%2F%2Fdx.doi.org%2F10.1016%2Fj.compstruc.2016.11.013

user-defined tag

• 7 Affordable and Clean Energy