Title :
Nonlinear best Chebyshev approximations and splines
Author_Institution :
Karpenko Physico-Mech. Inst., Nat. Acad. of Sci., Lviv, Ukraine
Abstract :
The necessity of using parametric nonlinear expressions and splines arises because real physical processes are described by many different analytical dependencies. The classic technique of finding the best Chebyshev approximation is also based on nonlinear approximations. But such approximations are not always possible. The author formulates a theorem that allows one to establish the condition of existence of the best Chebyshev approximation of a chosen kind
Keywords :
Chebyshev approximation; nonlinear equations; splines (mathematics); analytical dependencies; condition of existence; nonlinear approximations; nonlinear best Chebyshev approximations; parametric nonlinear expressions; real physical processes; splines; Approximation algorithms; Chebyshev approximation; Interpolation; Mechanical splines; Nonlinear equations; Polynomials;
Conference_Titel :
Mathematical Methods in Electromagnetic Theory, 1996., 6th International Conference on
Conference_Location :
Lviv
Print_ISBN :
0-7803-3291-1
DOI :
10.1109/MMET.1996.565662
