On integral separation of bounded linear random differential equations
Speaker: Doan Thai Son

Time: 14h00, Thursday, October 8, 2015
Location: Room 201, Building A5, Institute of Mathematics, 18 Hoang Quoc Viet, Cau Giay, Hanoi

Abstract: Our aim in this talk is to investigate the openness and denseness of the set of integrally separated systems in the  space of bounded linear random differential equations equipped with the $L^\infty  $ -metric. We show that in the general case, the set of integrally separated systems is open and dense. An exception is the case when the base space is isomorphic to the ergodic rotation flow of the unit circle, in which the set of integrally separated systems is open but not generic.

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