This paper presents an experimental performance study of implementations of
three symbolic algorithms for solving band matrix systems of linear algebraic
equations with heptadiagonal, pentadiagonal, and tridiagonal coefficient
matrices. The only assumption on the coefficient matrix in order for the
algorithms to be stable is nonsingularity. These algorithms are implemented
using the GiNaC library of C++ and the SymPy library of Python, considering
five different data storing classes. Performance analysis of the
implementations is done using the high-performance computing (HPC) platforms
"HybriLIT" and "Avitohol". The experimental setup and the results from the
conducted computations on the individual computer systems are presented and
discussed. An analysis of the three algorithms is performed.Comment: 7 pages, 9 tables, 4 figure