C. K. Li and V. Zou

Copyright © 2004 C. K. Li and V. Zou. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Let ρ(s) be a fixed infinitely differentiable function defined on R+=[0,∞) having the properties: (i) ρ(s)≥0, (ii) ρ(s)=0 for s≥1, and (iii) ∫Rmδn(x)dx=1 where δn(x)=cmnmρ(n2r2) and cm is the constant satisfying (iii). We overcome difficulties arising from computing ∇lδn and express this regular sequence by two mutual recursions and use a Java swing program to evaluate corresponding coefficients. Hence, we are able to imply the distributional product r−k⋅∇lδ for k=1,2,… and l=0,1,2,… with the help of Pizetti's formula and the normalization.