Hermite finite elements for convection-diffusion equations
For researchers in computational fluid dynamics, this provides improved finite element methods for convection-diffusion problems, though the improvement is incremental over existing mixed methods.
This work extends a Hermite finite element method, previously used for pure diffusion, to convection-diffusion equations, achieving flux continuity across element boundaries. Two methods are proposed and analyzed, with numerical results demonstrating their performance compared to standard mixed methods.
This work addresses techniques to solve convection-diffusion problems based on Hermite interpolation. We extend to the case of these equations a Hermite finite element method providing flux continuity across inter-element boundaries, shown to be a well-adapted tool for simulating pure diffusion phenomena (cf. V. Ruas, J. Comput. Appl. Maths., 246 p. 234-242, 2013). We consider two methods that can be viewed as non trivial improved versions of the lowest order Raviart-Thomas mixed method, corresponding to its extensions to convection-diffusion problems proposed by Douglas and Roberts (cf. Computational and Applied Mathematics, 1, p. 91-103, 1982) . A detailed convergence study is carried out for one of the methods, and numerical results illustrate the performance of both of them, as compared to each other and to the corresponding mixed methods.