代数 K 理论中的哈密顿元

Yasha Savelyev
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引用次数: 0

摘要

回想一下,拓扑复数 $K$ 理论会把一个空间 $X$ 上的复向量束 $E$ 的同构类与 $X$ 的复数 $K$ 理论群的一个元素联系起来。或者从代数$K$理论的角度来看,我们会分配一个同构类$[X \to K (\mathcal{K})]$,其中$\mathcal{K}$是希尔伯特空间上的紧凑算子环。我们证明,在一般交换环 $k$ 的代数 $K$ 理论中,有一个类似的故事,即用某些哈密顿纤维束代替复向量束。这种构造实际上是先在某个分类代数 $K$ 理论中分配元素,类似于 To\"en 的 $k$ 的二级 $K$ 理论。从这个分类代数$K$理论到经典变体有一个自然的映射。
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Hamiltonian elements in algebraic K-theory
Recall that topological complex $K$-theory associates to an isomorphism class of a complex vector bundle $E$ over a space $X$ an element of the complex $K$-theory group of $X$. Or from algebraic $K$-theory perspective, one assigns a homotopy class $[X \to K (\mathcal{K})]$, where $\mathcal{K}$ is the ring of compact operators on the Hilbert space. We show that there is an analogous story for algebraic $K$-theory of a general commutative ring $k$, replacing complex vector bundles by certain Hamiltonian fiber bundles. The construction actually first assigns elements in a certain categorified algebraic $K$-theory, analogous to To\"en's secondary $K$-theory of $k$. And there is a natural map from this categorified algebraic $K$-theory to the classical variant.
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