Bull. Austral. Math. Soc. 72(2) pp.291--298, 2005.

Bounded vector measures on effect algebras

Hong Taek Hwang

Longlu Li

Hunnam Kim

Received: 4th May, 2005

This paper was supported by Kumoh National Institute of Technology.

Abstract

Let (L, $\bot$ , $\oplus$ , 0, 1) be an effect algebra and X a locally convex space with dual X. A function $\mu$ : L $\rightarrow$ X is called a measure if $\mu$ (a $\oplus$ b) = $\mu$ (a) + $\mu$ (b) whenever a $\bot$ b in L and it is bounded if $\bigl \{$ $\mu$ (a_n) $\bigr \}_{{n=1}}^{{\infty }}$ is bounded for each orthogonal sequence {a_n} in L. We establish five useful conditions that are equivalent to boundedness for vector measures on effect algebras.

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MathSciNet: MR2183410

Z'blatt-MATH: 02246391

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Bulletin of the Australian Mathematical Society