An adaptive mixed finite element method using the Lagrange multiplier technique is used to solve elliptic problems with delta Dirac source terms. The problem arises in the use of Chow-Anderssen linear functional methodology to recover coefficients locally in parameter estimation of an elliptic equation from a point-wise measurement. In this article, we used a posterior error estimator based on averaging technique as refinement indicators to produce a cycle of mesh adaptation, which is experimentally shown to capture singularity phenomena. Our numerical results showed that the adaptive refinement process successfully refines elements around the center of the source terms. The results also showed that the global error estimation is better than uniform refinement process in terms of computation time.

Adaptive; Mixed Finite Element Method; A Posteriori Error Estimates; Point Source Function

Adler, J. H., Manteuffel, T. A., McCormick, S. F., Nolting, J. W., Ruge, J. W., & Tang, L. (2011). Efficiency based adaptive local refinement for first-order system least-squares formulations. SIAM Journal on Scientific Computing, 33(1), 1-24.

Bahriawati, C. and Carstensen, C. (2005). Three MATLAB implementations of the lowest-order Raviart-Thomas MFEM with a posteriori error control. Computational Methods in Applied Mathematics Computer Methods Applied Mathematics, 5(4), 333-361.

ShaoHong, D., and XiaoPing, X. (2008). Residual-based a posteriori error estimates of non-conforming finite element method for elliptic problems with Dirac delta source terms. Science in China Series A: Mathematics, 51(8), 1440-1460.

Tiandho, Y. (2017) Dirac particles emission from an elliptical black hole. Indonesian Journal of Science and Technology, 2(1), 50-56.

Yeh, W. (1986). Review of parameter-identification procedures in groundwater hydrology - the inverse problem. Water Research Research, 22, 95-108.

Zwolak, M. (2008). Numerical ansatz for solving integro-differential equations with increasingly smooth memory kernels: spin-boson model and beyond. Computational Science and Discovery, 1(1), 1-19.