Title :
Application of new family of atomic functions cha, n to solution of boundary value problems
Author :
Konovalov, Yaroslav Y. ; Kravchenko, Oleg V.
Author_Institution :
Dept. of Higher Math., Bauman Moscow State Tech. Univ., Moscow, Russia
Abstract :
Atomic functions present an effective mathematical apparatus for interpolation of functions. Given function is represented as a sum of scaled shifts of compactly supported atomic function. Fundamental property of such interpolation is that derivatives of given function are simultaneously interpolated with corresponding derivatives of interpolation. This property allows application of atomic function to numerical solution of differential equations.
Keywords :
boundary-value problems; differential equations; interpolation; atomic functions; boundary value problems; differential equations; interpolation; numerical solution; Boundary conditions; Diffraction; Interpolation; Mathematical model; Polynomials;
Conference_Titel :
Days on Diffraction (DD), 2014
Conference_Location :
St. Petersburg
Print_ISBN :
978-1-4799-7331-6
DOI :
10.1109/DD.2014.7036438
