A discontinuous Galerkin method with fractal elements
This work provides a novel numerical framework for solving PDEs on fractal domains, which is important for applications in materials science and fluid dynamics where fractal geometries arise.
The paper develops a discontinuous Galerkin method that directly operates on domains with fractal boundaries (e.g., Koch snowflake) using fractal elements, avoiding polygonal approximation. Numerical results with linear and quadratic basis functions demonstrate the method's effectiveness.
We formulate, analyse, and implement a discontinuous Galerkin finite element method (DG-FEM) for the approximation of the solution of an elliptic boundary value problem in a domain with fractal boundary. We consider the case of the Poisson equation in the Koch snowflake domain with zero Dirichlet boundary conditions, but our methodology can be generalised to other cases. Rather than first approximating the snowflake domain by a polygonal "prefractal'' and then applying a standard DG-FEM on the prefractal, we define a DG-FEM on the snowflake itself, using a geometry-conforming mesh (a fractal tiling) consisting of fractal elements, each similar to the original snowflake. Fluxes across inter-element boundaries, which are fractal curves, are represented in a weak way by integrals over element subdomains. We show how, for local polynomial basis functions, these integrals can be evaluated exactly using the similarity of the elements. We prove well-posedness and quasi-optimality of the method, and provide a partial convergence analysis. We present numerical results for piecewise linear and piecewise quadratic basis functions, which demonstrate the effectiveness of the method.