关于子音节和溶解的说明

Pub Date : 2024-05-15 DOI:10.2989/16073606.2024.2351184

J. Picado, A. Pultr

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引用次数: 1

摘要

溶解（由 Isbell 在 [3] 中提出，John-stone 在 [5] 中讨论，后来由 Plewe 在 [12, 13] 中利用）在这里被视为 L 的几何与更分散的 T ( L ) = S ( L ) op 的几何的关系，由自然嵌入 c L = ( a 7→ ↑ a ) 及其邻接局部映射 γ L : T ( L ) → L 中介。T ( L ) 和 TT ( L ) 之间相关的像前像迭加 ( γ L ) - 1 [ - ] ⊣ γ L [ - ] 被证明与 L 的第二步装配（塔）的迭加 c T ( L ) ⊣ γ T ( L ) 重合。这有助于解释 T ( L ) = S ( L ) op 作为 "近似离散提升"（有时被用作经典离散提升 DL → L 的一种模型）的作用，它是通向布尔性的中途分散。因此，使用具体子尺度技术简化了推理。我们以著名的普莱韦定理（Plewe's Theorem on ultranormality (and ultrapara-compactness) of S ( L )）为例加以说明，希望它能变得更加透明。

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Notes on sublocales and dissolution

The dissolution (introduced by Isbell in [3], discussed by John-stone in [5] and later exploited by Plewe in [12, 13]) is here viewed as the relation of the geometry of L with that of the more dispersed T ( L ) = S ( L ) op mediated by the natural embedding c L = ( a 7→ ↑ a ) and its adjoint localic map γ L : T ( L ) → L . The associated image-preimage adjunction ( γ L ) − 1 [ − ] ⊣ γ L [ − ] between the frames T ( L ) and TT ( L ) is shown to coincide with the adjunction c T ( L ) ⊣ γ T ( L ) of the second step of the assembly (tower) of L . This helps to explain the role of T ( L ) = S ( L ) op as an “almost discrete lift” (sometimes used as a sort of model of the classical discrete lift DL → L ) as a dispersion going halfway to Booleanness. Consequent use of the concrete sublocales technique simpliﬁes the reasoning. We illustrate it on the celebrated Plewe’s Theorem on ultranormality (and ultrapara-compactness) of S ( L ) which becomes (we hope) substantially more transparent.

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