Exact remainders for asymptotic expansions of fractional integrals

J. P. Mcclure; R. Wong

doi:10.1093/imamat/24.2.139

Exact remainders for asymptotic expansions of fractional integrals

J. P. Mcclure
, R. Wong

Research output: Journal Publications and Reviews › RGC 21 - Publication in refereed journal › peer-review

13 Citations (Scopus)

Abstract

This is a continuation of work begun in an earlier paper in which we used the theory of distributions to derive explicit expressions for the remainder terms associated with the asymptotic expansions of the Stieltjes transform. In this paper similar results are obtained for the fractional integral of order θ defined by. 1θf(x)=1/f(θ)σ^x _o(x-σ)^x-1f(t)dt, θ>.Heref(t) is a locally integrable function on [0, θ) and satisfies. f(t)∼σ a_st-5-0(ó >0),s=0. as θ. © 1979 Academic Press Inc. (London) Ltd.

Original language	English
Pages (from-to)	139-147
Journal	IMA Journal of Applied Mathematics (Institute of Mathematics and Its Applications)
Volume	24
Issue number	2
DOIs	https://doi.org/10.1093/imamat/24.2.139
Publication status	Published - Sept 1979
Externally published	Yes

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abstract = "This is a continuation of work begun in an earlier paper in which we used the theory of distributions to derive explicit expressions for the remainder terms associated with the asymptotic expansions of the Stieltjes transform. In this paper similar results are obtained for the fractional integral of order θ defined by. 1θf(x)=1/f(θ)σx o(x-σ)x-1f(t)dt, θ>.Heref(t) is a locally integrable function on [0, θ) and satisfies. f(t)∼σ ast-5-0({\'o} >0),s=0. as θ. {\textcopyright} 1979 Academic Press Inc. (London) Ltd.",

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AU - Wong, R.

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AB - This is a continuation of work begun in an earlier paper in which we used the theory of distributions to derive explicit expressions for the remainder terms associated with the asymptotic expansions of the Stieltjes transform. In this paper similar results are obtained for the fractional integral of order θ defined by. 1θf(x)=1/f(θ)σx o(x-σ)x-1f(t)dt, θ>.Heref(t) is a locally integrable function on [0, θ) and satisfies. f(t)∼σ ast-5-0(ó >0),s=0. as θ. © 1979 Academic Press Inc. (London) Ltd.

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M3 - RGC 21 - Publication in refereed journal

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SP - 139

EP - 147

JO - IMA Journal of Applied Mathematics (Institute of Mathematics and Its Applications)

JF - IMA Journal of Applied Mathematics (Institute of Mathematics and Its Applications)

IS - 2

ER -

Exact remainders for asymptotic expansions of fractional integrals

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