The Annals of Probability

Minimal Conditions for Weak Convergence to a Diffusion Process on the Line

Inge S. Helland

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Abstract

By transforming a central limit theorem for dependent variables, we find conditions for a sequence of processes with paths in $D\lbrack 0, \infty)$ to converge weakly to a diffusion process. Of the most important conditions, the first is related to (but weaker than) tightness, and in the next two we require that the first two conditional moments, given the past, of truncated increments in small time intervals, should stay close to the appropriate infinitesimal coefficients of the limiting diffusion times the length of the time interval. The limiting diffusions can have inaccessible or exit boundaries. We prove that our conditions are necessary and sufficient in order that: (1) the sequence of processes converges weakly in $D\lbrack 0, \infty)$; (2) any finite number of conditional expectations given the past of bounded, continuous functionals of the processes converge jointly in distribution to the "correct" value.

Article information

Source
Ann. Probab., Volume 9, Number 3 (1981), 429-452.

Dates
First available in Project Euclid: 19 April 2007

Permanent link to this document
https://projecteuclid.org/euclid.aop/1176994416

Digital Object Identifier
doi:10.1214/aop/1176994416

Mathematical Reviews number (MathSciNet)
MR614628

Zentralblatt MATH identifier
0459.60027

JSTOR
links.jstor.org

Subjects
Primary: 60F05: Central limit and other weak theorems
Secondary: 60J60: Diffusion processes [See also 58J65] 60B10: Convergence of probability measures

Keywords
Weak convergence to diffusion process random time change continuous mapping theorem minimal conditions for convergence

Citation

Helland, Inge S. Minimal Conditions for Weak Convergence to a Diffusion Process on the Line. Ann. Probab. 9 (1981), no. 3, 429--452. doi:10.1214/aop/1176994416. https://projecteuclid.org/euclid.aop/1176994416


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