正交加性算子的分离阶连续性

Bukovinian Mathematical Journal Pub Date : 1900-01-01 DOI:10.31861/bmj2021.01.17

I. Krasikova, O. Fotiy, M. Pliev, M. Popov

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引用次数: 0

摘要

我们的主要结果证明，在某些假设下，向量格间有阶有界正交加算子的一致有序连续性及其水平有序连续性暗示了它的有序连续性(我们说映射f:向量格E和F之间的E→F是水平向序连续的(前提是F将E中的横向递增阶收敛网络发送到F中的阶收敛网络)，F是均匀向序连续的(前提是F将均匀收敛网络发送到阶收敛网络)。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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ON SEPARATE ORDER CONTINUITY OF ORTHOGONALLY ADDITIVE OPERATORS

Our main result asserts that, under some assumptions, the uniformly-to-order continuity of an order bounded orthogonally additive operator between vector lattices together with its horizontally-to-order continuity implies its order continuity (we say that a mapping f : E → F between vector lattices E and F is horizontally-to-order continuous provided f sends laterally increasing order convergent nets in E to order convergent nets in F, and f is uniformly-to-order continuous provided f sends uniformly convergent nets to order convergent nets).

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Bukovinian Mathematical Journal

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