Strongly order continuous operators on Riesz spaces
In this paper we introduce two new classes of operators that we call strongly order continuous and strongly $\sigma$-order continuous operators. An operator $T:E\rightarrow F$ between two Riesz spaces is said to be strongly order continuous (resp. strongly $\sigma$-order continuous), if $x _\alpha \...
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| Main Authors | , |
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| Format | Journal Article |
| Language | English |
| Published |
12.12.2017
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| Subjects | |
| Online Access | Get full text |
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| Summary: | In this paper we introduce two new classes of operators that we call strongly
order continuous and strongly $\sigma$-order continuous operators. An operator
$T:E\rightarrow F$ between two Riesz spaces is said to be strongly order
continuous (resp. strongly $\sigma$-order continuous), if $x _\alpha
\xrightarrow{uo}0$ (resp. $x _n \xrightarrow{uo}0$) in $E$ implies $Tx _\alpha
\xrightarrow{o}0$ (resp. $Tx _n \xrightarrow{o}0$) in $F$. We give some
conditions under which order continuity will be equivalent to strongly order
continuity of operators on Riesz spaces. We show that the collection of all
$so$-continuous linear functionals on a Riesz space $E$ is a band of $E^\sim$. |
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| DOI: | 10.48550/arxiv.1712.04275 |