超固同位代数

Sofía Marlasca Aparicio
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引用次数: 0

摘要

由克劳森和肖尔泽引入的 $\mathbb{Q}$ 或 $\mathbb{F}_p$ 上的实体模块是完整拓扑向量空间的一个良好变体,它构成了一个对称单义的格罗内迪克阿贝尔范畴。对于离散域$k$,我们构建了超实体$k$模块范畴,它特化为在$\mathbb{Q}$或$\mathbb{F}_p$上的实体模块。在这一背景下,我们展示了一些交换代数结果,比如中山定理的超实体变体。我们还探索了动画和$\mathbb{E}_\infty$超实体$k$代数形式的高等代数,以及它们的变形理论。我们将重点放在完全无穷 $k$-gebras 的子类上,并证明它等价于等特征形式模量问题的相切复数。
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Ultrasolid Homotopical Algebra
Solid modules over $\mathbb{Q}$ or $\mathbb{F}_p$, introduced by Clausen and Scholze, are a well-behaved variant of complete topological vector spaces that forms a symmetric monoidal Grothendieck abelian category. For a discrete field $k$, we construct the category of ultrasolid $k$-modules, which specialises to solid modules over $\mathbb{Q}$ or $\mathbb{F}_p$. In this setting, we show some commutative algebra results like an ultrasolid variant of Nakayama's lemma. We also explore higher algebra in the form of animated and $\mathbb{E}_\infty$ ultrasolid $k$-algebras, and their deformation theory. We focus on the subcategory of complete profinite $k$-algebras, which we prove is contravariantly equivalent to equal characteristic formal moduli problems with coconnective tangent complex.
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