cdfcor: rational approximation to finite set of data. differential correction algorithm to compute a best uniform generalized rational approximation p/q to a function defined on a finite set of grid points, with the options of including a weight function and linear equality and inequality constraints on the coefficients. (Source: http://plato.asu.edu)
Keywords for this software
References in zbMATH (referenced in 4 articles , 1 standard article )
Showing results 1 to 4 of 4.
- Kaufman, E. H. jun.; Leeming, D. J.; Taylor, G. D.: Adaptive monotone rational approximation on finite sets (2003)
- Dennis, J. E. jun.; El-Alem, Mahmoud; Williamson, Karen: A trust-region approach to nonlinear systems of equalities and inequalities (1999)
- Kaufman, E. H. jun.; Taylor, G. D.: Coupled constrained rational approximation (1993)
- Kaufman, E. H. jun.; Taylor, G. D.: Linearly constrained generalized rational approximation (1989)