Numerical treatment of a generalized Vandermonde system of equations

AbstractA stable method is proposed for the numerical solution of a linear system of equations having a generalized Vandermonde matrix. The method is based on Gaussian elimination and establishes explicit expressions for the elements of the resulting upper triangular matrix. These elements can be computed by means of sums of exclusively positive terms. In an important special case these sums can be reduced to simple recursions. Finally the method is retraced for the case of a confluent type of generalized Vandermonde matrix