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Distribution of the supremum of the two-parameter Yeh-Wiener process on the boundary

Published online by Cambridge University Press:  14 July 2016

S. R. Paranjape
Affiliation:
Miami University, Oxford, Ohio
C. Park
Affiliation:
Miami University, Oxford, Ohio

Abstract

Let D = [0, S] × [0, T] be a rectangle in E2 and X(s, t), (s, t)∈D, be a two parameter Yeh-Wiener process. This paper finds the probability distribution of the supremum of X(s, t) on the boundary of D by taking the limit of the probability distribution of the supremum of X(s, t) along certain paths as these paths approach the boundary of D. The probability distribution of the supremum of X(s, t) on the boundary of D gives a nice lower bound for the probability distribution of the supremum of X(s, t) on D, which is unknown.

Type
Short Communications
Copyright
Copyright © Applied Probability Trust 1973 

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References

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