@article {HwLiKim2005,
 author="Hong Taek Hwang, Longlu Li and Hunnam Kim",
 title={Bounded vector measures on effect algebras},
 journal="Bull. Austral. Math. Soc.",
 fjournal={Bulletin of the Australian Mathematical Society},
 volume="72",
 year="2005",
 number="2",
 pages="291--298",
 issn="0004-9727",
 coden="ALNBAB",
 language="English",
 date="4th May, 2005",
 classmath=" 28B10, 03G12, 46L51, 81P10",
 publisher={AMPAI, Australian Mathematical Society},
 MRnumber="MR2183410",
 ZBLnumber="02246391",
 url="http://www.austms.org.au/Publ/Bulletin/V72P2/722-5136-HwLiKim/index.shtml",
 acknowledgement={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 $X^{\prime }$. 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. }
}