Completeness results for metrized rings and lattices

Categories and General Algebraic Structures with Application Pub Date : 2018-08-13 DOI:10.29252/CGASA.11.1.149

G. Bergman

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Abstract

The Boolean ring $B$ of measurable subsets of the unit interval, modulo sets of measure zero, has proper radical ideals (e.g., $\{0\})$ that are closed under the natural metric, but has no prime ideals closed under that metric; hence closed radical ideals are not, in general, intersections of closed prime ideals. Moreover, $B$ is known to be complete in its metric. Together, these facts answer a question posed by J.Gleason. From this example, rings of arbitrary characteristic with the corresponding properties are obtained. The result that $B$ is complete in its metric is generalized to show that if $L$ is a lattice given with a metric satisfying identically either the inequality $d(x\vee y,\,x\vee z)\leq d(y,z)$ or the inequality $d(x\wedge y,\,x\wedge z)\leq d(y,z),$ and if in $L$ every increasing Cauchy sequence converges and every decreasing Cauchy sequence converges, then every Cauchy sequence in $L$ converges; i.e., $L$ is complete as a metric space. We show by example that if the above inequalities are replaced by the weaker conditions $d(x,\,x\vee y)\leq d(x,y),$ respectively $d(x,\,x\wedge y)\leq d(x,y),$ the completeness conclusion can fail. We end with two open questions.

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度量环和格的完备性结果

单位区间的可测子集(测度为0的模集)的布尔环$B$具有固有的根理想(例如$\{0\})$在自然度规下闭合，但没有在该度规下闭合的素理想;因此，封闭的根本理想通常不是封闭的素理想的交集。此外，已知$B$的度规是完备的。总之，这些事实回答了格里森提出的一个问题。从这个例子中，得到了具有相应性质的任意特征环。推广了$B$在度规上完备的结果，证明了如果$L$是一个格，其度规同时满足不等式$d(x\vee y,\,x\vee z)\leq d(y,z)$或不等式$d(x\wedge y,\,x\wedge z)\leq d(y,z),$，并且如果$L$中每一个递增的柯西序列收敛，每一个递减的柯西序列收敛，则$L$中的每一个柯西序列收敛;例如，$L$作为度量空间是完备的。通过实例证明，如果用较弱的条件$d(x,\,x\vee y)\leq d(x,y),$分别代替上述不等式$d(x,\,x\wedge y)\leq d(x,y),$，则完备性结论可能失效。我们以两个开放性问题结束。

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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Categories and General Algebraic Structures with Application

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