Asymptotic Separation of Variables
Document Type
Article
Publication Date
9-1-1993
Abstract
We study generalized functions f{hook}(x) that admit the asymptotic separation of variables f{hook}(λx) ∼ ρ1(λ)h1(x) + ρ2(λ)h2(x) + ρ3(λ)h3(x) + ···, as λ → ∞, where {ρn(λ)} is an asymptotic sequence. Among other results, we show that when the asymptotic separation of variables holds, the terms have to be homogeneous and associated homogeneous generalized functions. The asymptotic expansion of ρ(λx), as λ → ∞, where ρ is a regularly varying function, is also considered. © 1993 Academic Press. All rights reserved.
Publication Source (Journal or Book title)
Journal of Mathematical Analysis and Applications
First Page
130
Last Page
142
Recommended Citation
Estrada, R., & Kanwal, R. (1993). Asymptotic Separation of Variables. Journal of Mathematical Analysis and Applications, 178 (1), 130-142. https://doi.org/10.1006/jmaa.1993.1296