real analysis In mathematics, the branch of real analysis studies the behavior of real numbers, sequences and series of real numbers, and real functions. Some particular properties of real-valued sequences and functions that real analysis studies include converg ...

, a branch of

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, a slowly varying function is a

function of a real variable In mathematical analysis, and applications in geometry, applied mathematics, engineering, and natural sciences, a function of a real variable is a function (mathematics), function whose domain of a function, domain is the real numbers \mathbb, or ...

whose behaviour at

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is in some sense similar to the behaviour of a function converging at infinity. Similarly, a regularly varying function is a function of a real variable whose behaviour at infinity is similar to the behaviour of a

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function (like a

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) near infinity. These classes of functions were both introduced by Jovan Karamata,See See . and have found several important applications, for example in

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Basic definitions

. A

measurable function In mathematics and in particular measure theory, a measurable function is a function between the underlying sets of two measurable spaces that preserves the structure of the spaces: the preimage of any measurable set is measurable. This is in di ...

is called ''slowly varying'' (at infinity) if for all , :

\lim_ \frac=1.

. Let . Then is a regularly varying function if and only if

\forall a > 0, g_L(a) = \lim_ \frac \in \mathbb^

. In particular, the

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must be finite. These definitions are due to Jovan Karamata. Note. In the regularly varying case, the sum of two slowly varying functions is again slowly varying function.

Basic properties

Regularly varying functions have some important properties: a partial list of them is reported below. More extensive analyses of the properties characterizing regular variation are presented in the monograph by .

Uniformity of the limiting behaviour

. The limit in and is

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if is restricted to a compact interval.

Karamata's characterization theorem

. Every regularly varying function is of the form :

f(x)=x^\beta L(x)

where * is a

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, * is a slowly varying function. Note. This implies that the function in has necessarily to be of the following form :

g(a)=a^\rho

where the real number is called the ''index of regular variation''.

Karamata representation theorem

. A function is slowly varying if and only if there exists such that for all the function can be written in the form :

L(x) = \exp \left( \eta(x) + \int_B^x \frac \,dt \right)

where * is a bounded

of a real variable converging to a finite number as goes to infinity * is a bounded measurable function of a real variable converging to zero as goes to infinity.

Examples

* If is a measurable function and has a limit ::

\lim_ L(x) = b \in (0,\infty),

:then is a slowly varying function. * For any , the function is slowly varying. * The function is not slowly varying, nor is for any real . However, these functions are regularly varying.

Notes

References

* * * {{Citation , last1=Galambos , first1=J. , last2=Seneta , first2=E. , title=Regularly Varying Sequences , year=1973 , journal=

Proceedings of the American Mathematical Society ''Proceedings of the American Mathematical Society'' is a monthly peer-reviewed scientific journal of mathematics published by the American Mathematical Society. As a requirement, all articles must be at most 15 printed pages. According to the ' ...

, issn=0002-9939 , volume=41 , issue=1 , pages=110–116 , doi=10.2307/2038824 , jstor=2038824, doi-access=free . Real analysis Tauberian theorems Types of functions