NEW REPRESENTATION OF SLOWLY VARYING FUNCTIONS
DOI:
https://doi.org/10.46991/PYSUA.2001.35.1.047Abstract
For a slowly varying function $L(t)$ a new integral representation is obtained:
$$L(t) = \mu(t)\int\limits_t_0 ^t b(x)d\ln x, t\geq t_0> 0, $$
where $\mu(t)$ is measurable on $[t_0, +\infty), b(t)$ is continuous on $[t_0, +\infty)$ and
$\lim \limits_{t\ringrow + \infty}(b(t) / L(t))= 0.$
This representation allows to generalize D.D. Adamovich’s classical result on equivalent slowly varying functions and to extend the statement of A. A. Goldberg theorem.
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Published
2001-03-16
Issue
Section
Mathematics
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Copyright (c) 2001 Proceedings of the YSU
This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.
How to Cite
Danielyan, I. E., & Mikaelyan, G. v. (2001). NEW REPRESENTATION OF SLOWLY VARYING FUNCTIONS. Proceedings of the YSU A: Physical and Mathematical Sciences, 35(1 (194), 47-52. https://doi.org/10.46991/PYSUA.2001.35.1.047
