Galerkin Scheme Using Biorthogonal Wavelets on Intervals for Elliptic Interface Problems

Abstract

This paper presents a wavelet Galerkin method for solving elliptic interface problems of the form -∇·(a∇ u)=f in , where is a smooth interface within . Since the scalar variable coefficient a>0 and source term f are often discontinuous across , the solution u typically has discontinuous gradient ∇ u across and hence u∈ H1.5(), posing significant challenges for traditional numerical methods. By utilizing a compactly supported biorthogonal wavelet for H10(), we develop a strategy that incorporates additional wavelet elements (or basis functions) along the interface to resolve the complex geometry of the interface and the resulting gradient discontinuities. For the two-dimensional (2D) elliptic interface problem, the proposed method achieves near-optimal convergence rates: O(h |(h)|) in the H1()-norm and (h2 |(h)|2) in the L2-norm with respect to the approximation order. A key theoretical contribution is the use of the dual biorthogonal wavelet basis to establish the H1() convergence results. This is supported by the development of weighted Bessel properties for wavelets and several inequalities in fractional Sobolev spaces. To maintain high accuracy and robustness against high-contrast coefficients, our method leverages an augmented set of wavelet elements, similar to meshfree approaches, thereby eliminating the need for the complex re-meshing required by finite element methods. Unlike existing techniques, this wavelet Riesz basis framework captures the geometry of seamlessly while ensuring that the condition numbers of the coefficient matrices remain small and uniformly bounded, independent of the problem size.

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