📝 SummarXiv

Abstract

The bilinear form u^\top f(A) v of matrix functions appears in many application problems, where u, v \in R^n\), A \in R^{n * n}\), and f(z) is a given analytic function.The IDR(s) method effectively reduces computational complexity and storage requirements by introducing dimension reduction techniques, while maintaining the numerical stability of the algorithm. This paper studies the numerical algorithm and posterior error estimation for the matrix function bilinear form u^{\top} f(A) v based on the IDR(s) method. Through the error analysis of the IDR(s) algorithm, the corresponding error expansion is derived, and it is verified that the leading term of the error expansion serves as a reliable posterior error estimate. Based on this, in this paper a corresponding stopping criterion is proposed. This approach is dedicated to improving computational efficiency, especially by showing excellent performance in handling ill-posed and large-scale problems.