A Low-cost and Numerically Stable Algorithm to Solve Tridiagonal Systems via Quasiseparable Matrices

Abstract: This paper presents an approach to efficiently solve a system of linear equations characterized by n × n non-singular tridiagonal matrices utilizing quasiseparable structures. By employing sparse factorization of the quasiseparable matrices, we obtain a low-cost, i.e., O(n), in contrast to the brute-force computations associated with solving tridiagonal systems with complexity O(n3). Furthermore, the proposed algorithm provides an alternative method for solving systems of equations having tridiagonal Toeplitz… Show more