A bi-variant algebraic cobordism via correspondences

Pub Date : 2024-04-03 DOI:10.4310/pamq.2024.v20.n2.a8

Shoji Yokura

引用次数: 0

Abstract

A bi-variant theory $\mathbb{B}(X,Y)$ defined for a pair $(X,Y)$ is a theory satisfying properties similar to those of Fulton–Mac Pherson’s bivariant theory $\mathbb{B}(X \xrightarrow{f} Y)$ defined for a morphism $f : X \rightarrow Y$. In this paper, using correspondences we construct a bi-variant algebraic cobordism $\Omega^{\ast,\sharp} (X, Y )$ such that $\Omega^{\ast,\sharp}(X, pt)$ is isomorphic to Lee–Pandharipande’s algebraic cobordism of vector bundles $\Omega \underline{}_{\ast,\sharp} (X)$. In particular, $\Omega^\ast (X, pt) = \Omega^{\ast,0} (X, pt)$ is isomorphic to Levine–Morel’s algebraic cobordism $\Omega \underline{}_{\ast} (X)$. Namely, $\Omega^{\ast,\sharp} (X,Y)$ is a bi-variant version of Lee–Pandharipande’s algebraic cobordism of bundles $\Omega_{\ast,\sharp} (X)$.

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通过对应关系实现双变代数共线性

为一对$(X,Y)$定义的双变量理论$/mathbb{B}(X,Y)$是一种满足与富尔顿-麦克-费森的双变量理论$/mathbb{B}(X \xrightarrow{f} Y)$相似的性质的理论，它为态量$f ：X （右箭头 Y）$ 的态量定义。在本文中，我们利用对应关系构造了一个双变代数共线$\Omega^{ast,\sharp} (X, Y )$，使得$\Omega^{ast,\sharp}(X, pt)$与Lee-Pandharipande的向量束代数共线$\Omega \underline{}_{\ast,\sharp} (X)$同构。尤其是，$\Omega^\ast (X, pt) = \Omega^{\ast,0} (X, pt)$ 与 Levine-Morel 的代数协整 $\Omega \underline{}_{\ast} (X)$ 同构。也就是说，$Omega^{ast,\sharp} (X,Y)$ 是 Lee-Pandharipande 的代数共线束 $\Omega_{ast,\sharp} (X)$ 的双变量版本。

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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