AbstractThis is a sequel to my previous paper concerning the determination of the coefficients in the polynomials which define Padé fractions, where the coefficients are found by solving systems of linear equations. The present note uses the same models and computer as before, but the computations are far more extensive so as to reveal more pointedly the effects of round off error in the coefficients as the order of the system increases. Only the main diagonal Padé entries are studied numerically. The numerics are achieved using two routines in LINPACK one of which evaluates a condition number for the matrix. This is advantageous if one suspects ill conditioning. In our previous paper, it was shown that though the relative errors in the num...
AbstractThe error propagation characteristics of the polynomial evaluation schemes of Horner, Clensh...
Abstract. We investigate how extra-precise accumulation of dot products can be used to solve ill-con...
AbstractIn this paper, a new definition of a reduced Padé approximant and an algorithm for its compu...
AbstractThis is a sequel to my previous paper concerning the determination of the coefficients in th...
AbstractWe explore reliability, stability and accuracy of determining the polynomials which define t...
A roundoff error analysis of formulae for evaluating polynomials is performed. The considered formul...
AbstractWork on Padé or Padé-type approximants ultimately involves the explicitdetermination of the ...
AbstractIn this paper two methods to compute Padé approximants are given. These methods are based on...
Abstract. The inverse scaling and squaring method for evaluating the logarithm of a matrix takes rep...
AbstractThis paper will write equations of the round-off errors for a new direct solver of a system ...
International audienceThis paper deals with the polynomial linear system solving with errors (PLSwE)...
Padé approximation is a rational approximation constructed from the coefficients of a power series o...
AbstractEstimates are made of the effect of perturbations of the power series coefficients on the co...
Program year: 1981/1982Digitized from print original stored in HDRA rational function is defined as ...
The \textit{tropical scaling} algorithm has experimentally shown to generate accurate results in com...
AbstractThe error propagation characteristics of the polynomial evaluation schemes of Horner, Clensh...
Abstract. We investigate how extra-precise accumulation of dot products can be used to solve ill-con...
AbstractIn this paper, a new definition of a reduced Padé approximant and an algorithm for its compu...
AbstractThis is a sequel to my previous paper concerning the determination of the coefficients in th...
AbstractWe explore reliability, stability and accuracy of determining the polynomials which define t...
A roundoff error analysis of formulae for evaluating polynomials is performed. The considered formul...
AbstractWork on Padé or Padé-type approximants ultimately involves the explicitdetermination of the ...
AbstractIn this paper two methods to compute Padé approximants are given. These methods are based on...
Abstract. The inverse scaling and squaring method for evaluating the logarithm of a matrix takes rep...
AbstractThis paper will write equations of the round-off errors for a new direct solver of a system ...
International audienceThis paper deals with the polynomial linear system solving with errors (PLSwE)...
Padé approximation is a rational approximation constructed from the coefficients of a power series o...
AbstractEstimates are made of the effect of perturbations of the power series coefficients on the co...
Program year: 1981/1982Digitized from print original stored in HDRA rational function is defined as ...
The \textit{tropical scaling} algorithm has experimentally shown to generate accurate results in com...
AbstractThe error propagation characteristics of the polynomial evaluation schemes of Horner, Clensh...
Abstract. We investigate how extra-precise accumulation of dot products can be used to solve ill-con...
AbstractIn this paper, a new definition of a reduced Padé approximant and an algorithm for its compu...