Two Algorithms for Solving A General Backward Pentadiagonal Linear Systems
Provides specialized solvers for a niche linear system type, but the contribution is incremental and lacks quantitative comparison.
The paper presents two efficient algorithms (computational and symbolic) for solving backward pentadiagonal linear systems, with straightforward implementation in CAS like MAPLE and MATLAB. Examples demonstrate the algorithms, and the symbolic method is claimed to be competitive with other approaches.
In this paper we present an efficient computational and symbolic algorithms for solving a backward pentadiagonal linear systems. The implementation of the algorithms using Computer Algebra Systems (CAS) such as MAPLE, MACSYMA, MATHEMATICA, and MATLAB are straightforward. An examples are given in order to illustrate the algorithms. The symbolic algorithm is competitive the other methods for solving a backward pentadiagonal linear systems.