Symmetric triple diagonal matrix has always been an active research field. It is of great significance to the theoretical study of computation and its practical application. Based on Jacobi transformation, the paper combines with the symmetric and triple diagonal, and introduces the computation of one-side Jacobi. Then it provides a one-side Jacobi parallel algorithm for symmetric triple diagonal eigenvalue, which has high efficiency by theoretical analysis and computation simulation.

An efficient parallel algorithm design for symmetric triple diagonal eigenvalue

Parallel computing plays an increasingly important role in the field of numerical computing, with technological developments permitting an ever-increasing range of potential applications. However, the design of parallel numerical programs is far more difficult than serial programs, especially in the face of complex application problems, the development and performance optimization of massive parallel numerical programs are very challenging. High-performance numerical software often requires a comprehensive and long exploration process from design to implementation. With the help of existing parallel algorithm packages, this paper develops efficient finite element parallel programs without accounting for complex data distribution and communication. In doing so, this method greatly reduces the difficulty and cost of finite element parallel computing and shortens the development cycle. This paper makes a series of optimizations for algorithms and computational processes to improve their stability, computational efficiency, and parallel scalability. Subsequently, the algorithm is made suitable for solving the eigenvalues of a large-scale sparse matrix in a parallel computing environment. The software package formed in this paper depends neither on the specific structure of the matrix nor on the vector, meaning it can be applied to arbitrary matrix-vector structures. The test results for several typical matrices show that the algorithm and software package have not only good numerical stability and scalability, but also a greater improvement in efficiency when compared with other parallel solvers. 

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An efficient parallel blocking algorithm design for reducing a symmetric matrix into tridiagonal form

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An efficient parallel algorithm design for symmetric triple diagonal eigenvalue

Eigenvalue solution of sparse matrix based on MPETSc

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An efficient parallel algorithm design for symmetric triple diagonal eigenvalue

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