Convergence analysis of the Newton-Schur method for the symmetric elliptic eigenvalue problem

Abstract

In this paper, we consider the Newton-Schur method in Hilbert space and obtain quadratic convergence. For the symmetric elliptic eigenvalue problem discretized by the standard finite element method and non-overlapping domain decomposition method, we use the Steklov-Poincar\'e operator to reduce the eigenvalue problem on the domain into the nonlinear eigenvalue subproblem on , which is the union of subdomain boundaries. We prove that the convergence rate for the Newton-Schur method is εN≤ CH2(1+(H/h))2ε2, where the constant C is independent of the fine mesh size h and coarse mesh size H, and εN and ε are errors after and before one iteration step respectively. Numerical experiments confirm our theoretical analysis.

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