
This paper presents lowest-degree robust finite element schemes for solving inhomogeneous bi-Laplace problems, including an inhomogeneous fourth-order elliptic singular perturbation problem and a Helmholtz transmission eigenvalue problem. The schemes use the reduced rectangle Morley (RRM) element space with piecewise quadratic polynomials, which are of the lowest degree possible.


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robust-finite-element-schemes-for-inhomogeneous-bi-laplace-problems


Robust Finite Element Schemes for Inhomogeneous Bi-Laplace Problems
