弱总体维数最多为1的环上的可定义通道

Pub Date : 2019-01-14 DOI:10.5565/publmat6512106
S. Bazzoni, Michal Hrbek
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引用次数: 4

摘要

在弱全局维数的环R的无界导出范畴D(R)至多为1的情况下,我们考虑具有可定义coaisle的t-结构。其中稳定的t结构(即,由一对三角化子范畴组成的t结构)正是与派生范畴的粉碎局部化相关的结构。这样,我们现在的结果推广了[B\v的结果{S}17]对于非稳定情况。如稳定情况[B\v{S}17],我们在很大程度上局限于交换集,并给出了局部情况下可定义共岛的一个完整分类,即高估域。结果表明,与砸碎子范畴的稳定情况不同,可定义的共岛并不总是由同调环同构产生的。我们还考虑了t结构的望远镜猜想的一个非稳定版本,并给出了弱全局维数的交换环的一个环理论刻画,它至多满足一个。
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Definable coaisles over rings of weak global dimension at most one
In the setting of the unbounded derived category D(R) of a ring R of weak global dimension at most one we consider t-structures with a definable coaisle. The t-structures among these which are stable (that is, the t-structures which consist of a pair of triangulated subcategories) are precisely the ones associated to a smashing localization of the derived category. In this way, our present results generalize those of [B\v{S}17] to the non-stable case. As in the stable case [B\v{S}17], we confine for the most part to the commutative setting, and give a full classification of definable coaisles in the local case, that is, over valuation domains. It turns out that unlike in the stable case of smashing subcategories, the definable coaisles do not always arise from homological ring epimorphisms. We also consider a non-stable version of the telescope conjecture for t-structures and give a ring-theoretic characterization of the commutative rings of weak global dimension at most one for which it is satisfied.
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