The so-called Generalized-Confluent Cauchy-Vandermonde (GCCV) matrices of the form [C,V] consisting of a generalized-confluent Cauchy part C and a generalized-confluent Vandermonde part V are considered. A simple relationship between GCCV and classical confluent Cauchy-Vandermonde (CCV) matrices is given. This leads to the reduction of the displacement structure, inversion formulas and factorizations of GCCV matrices, and the interpolation interpretations of linear systems with such GCCV coefficient matrices as tangential interpolation problems to the corresponding results of CCV matrices. The criteria of invertibility and (left, right) inversion formulas for such matrices are given. All results are stated for the general case of multiple interpolation nodes, extending the work of Heinig, and Vavrin among others.

• 出版日期2000-3-15
• 单位中国农业大学