Generalization of a reduced Trefftz type approach
Sulaiman Abo Diab

TL;DR
This paper explores variational concepts of reduced Trefftz methods, analyzing their relationship with displacement and hybrid approaches, and proposes strategies for developing invariant finite elements with demonstrated convergence and performance benefits.
Contribution
It introduces a unified variational framework for reduced Trefftz approaches and presents a new strategy for creating invariant finite elements with broad geometric applicability.
Findings
Demonstrated convergence in linear static and kinetic problems
Compared reduced Trefftz methods with other approaches for conformity
Showed improved numerical performance of developed finite elements
Abstract
Summary This work presents variational concepts associated with reduced Trefftz type approaches and discusses the interrelationship between various concepts of the displacement, hybrid and Trefftz methods. The basic concept of the displacement version of the reduced Trefftz method operates on the natural boundary conditions enforced in an integral form whereas the stress version of the reduced Trefftz type approach operates on the essential boundary conditions enforced in an integral sense. The application of the method proposed in the framework of the finite element method is briefly outlined. The methods used by the reduced Trefftz type approach for enforcing conformity and interelement continuity between neighboured elements are also discussed. Comparisons with other known methods for the same purpose are performed. General strategy for developing finite elements of general geometric…
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