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http://dx.doi.org/10.4134/BKMS.2005.42.2.231

COMPARISON FOR SOLUTIONS OF A SPDE DRIVEN BY MARTINGALE MEASURE

CHO, NHAN-SOOK (HANSUNG UNIVERSITY)

Publication Information

Bulletin of the Korean Mathematical Society / v.42, no.2, 2005 , pp. 231-244 More about this Journal

Abstract

We derive a comparison theorem for solutions of the following stochastic partial differential equations in a Hilbert space H. $Lu^i=\alpha(u^i)M(t,\; x)+\beta^i(u^i),\;for\;i=1,\;2,$ $where\;Lu^i=\;\frac{\partial u^i}{\partial t}\;-\;Au^{i}$ , A is a linear closed operator on Hand M(t, x) is a spatially homogeneous Gaussian noise with covariance of a certain form. We are going to show that if $\beta^1\leq\beta^2\;then\;u^1{\leq}u^2$ under some conditions.

Keywords

comparison theorem; SPDE; martingale measure;

Citations & Related Records

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