Cauchy's functional equation and extensions: Goldie's equation and inequality, the Golab-Schinzel equation and Beurling's equation

Bingham N. H.; Ostaszewski A. J.

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Cauchy's functional equation and extensions: Goldie's equation and inequality, the Golab-Schinzel equation and Beurling's equation

机译：Cauchy的函数方程和扩展：Goldie方程和不等式，Golab-Schinzel方程和Beurling方程

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The Cauchy functional equation is not only the most important single functional equation, it is also central to regular variation. Classical Karamata regular variation involves a functional equation and inequality due to Goldie; we study this, and its counterpart in Beurling regular variation, together with the related Golab-Schinzel equation.

机译：柯西泛函方程不仅是最重要的单一泛函，而且对于规则变化也很重要。古典Karamata正则变化涉及一个函数方程和由于Goldie引起的不等式。我们将对此进行研究，并研究其与Beurling正则变化的对应关系，以及相关的Golab-Schinzel方程。

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《Aequationes mathematicae》 |2015年第5期|共18页
作者
Bingham N. H.; Ostaszewski A. J.;
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正文语种 eng
中图分类数学;
关键词
Regular variation; Beurling regular variation; Beurling's equation; Golab-Schinzel functional equation;

机译：正则变化;Beurling正变;Beurling方程;Golab-Schinzel函数方程;
入库时间 2022-08-18 09:54:58

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1. Cauchy's functional equation and extensions: Goldie's equation and inequality, the Golab-Schinzel equation and Beurling's equation [J] . Bingham N. H., Ostaszewski A. J. Aequationes mathematicae . 2015,第5期

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4. A Note on Harnack Inequality for Stochastic Functional Differential Equations [C] . Zhizhong Yang, Hangsheng Tan International conference on computer and automation engineering . 2011

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8. Class of Neutral Functional Differential Equations and the Abstract Cauchy Problem [R] . Bentil, D. E. 1985

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Cauchy's functional equation and extensions: Goldie's equation and inequality, the Golab-Schinzel equation and Beurling's equation

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