On the growth and stability of real-analytic functions

D. H. Phong; E. M. Stein; J. A. Sturm

On the growth and stability of real-analytic functions

D. H. Phong, E. M. Stein, J. A. Sturm

Research output: Contribution to journal › Article › peer-review

Abstract

This paper addresses the issue of whether integrals of real-analytic functions remain finite under small deformations. An approach based on uniform estimates for certain classes of one-dimensional integrals is introduced. It is powerful enough to recover the stability properties of real integrals in two dimensions which follow from the work of Karpushkin, as well as produce new results in higher dimensions. In dimension three, the new stability results are sharp, as shown by the well-known example of Varchenko.

Original language	English (US)
Pages (from-to)	519-554
Number of pages	36
Journal	American Journal of Mathematics
Volume	121
Issue number	3
State	Published - Jun 1999
Externally published	Yes

All Science Journal Classification (ASJC) codes

General Mathematics

Cite this

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title = "On the growth and stability of real-analytic functions",

abstract = "This paper addresses the issue of whether integrals of real-analytic functions remain finite under small deformations. An approach based on uniform estimates for certain classes of one-dimensional integrals is introduced. It is powerful enough to recover the stability properties of real integrals in two dimensions which follow from the work of Karpushkin, as well as produce new results in higher dimensions. In dimension three, the new stability results are sharp, as shown by the well-known example of Varchenko.",

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On the growth and stability of real-analytic functions

Abstract

All Science Journal Classification (ASJC) codes

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