可操作子范畴的同伦论

Benoit Fresse, Victor Turchin, Thomas Willwacher
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引用次数: 7

摘要

我们研究拓扑操作符的子范畴\({\mathsf {P}}\),使得\({\mathsf {P}}(0) = *\)(在我们的术语中是酉操作符的范畴)。我们使用这个范畴继承了一个模型结构,就像拓扑空间中所有操作数的范畴一样,并且这个酉操作数子范畴嵌入到所有操作数范畴的函子允许一个左Quillen伴随子。我们证明了这个左Quillen伴随函子的派生函子在同伦范畴水平上推导出我们范畴嵌入的派生函子的左逆。由此我们推导出与一元操作数模型范畴相关的派生映射空间与我们在拓扑空间中所有操作数的模型范畴中形成的标准派生操作数映射空间是同伦等价的。我们证明了在所有k截断的操作数的模型范畴内的k截断的酉操作数的子范畴,对于任何固定的密度界\(k\ge 1\)都成立类似的命题,其中k截断的操作数表示定义到密度k的操作数。
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The homotopy theory of operad subcategories

We study the subcategory of topological operads \({\mathsf {P}}\) such that \({\mathsf {P}}(0) = *\) (the category of unitary operads in our terminology). We use that this category inherits a model structure, like the category of all operads in topological spaces, and that the embedding functor of this subcategory of unitary operads into the category of all operads admits a left Quillen adjoint. We prove that the derived functor of this left Quillen adjoint functor induces a left inverse of the derived functor of our category embedding at the homotopy category level. We deduce from this result that the derived mapping spaces associated to our model category of unitary operads are homotopy equivalent to the standard derived operad mapping spaces, which we form in the model category of all operads in topological spaces. We prove that analogous statements hold for the subcategory of k-truncated unitary operads within the model category of all k-truncated operads, for any fixed arity bound \(k\ge 1\), where a k-truncated operad denotes an operad that is defined up to arity k.

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来源期刊
Journal of Homotopy and Related Structures
Journal of Homotopy and Related Structures Mathematics-Geometry and Topology
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期刊介绍: Journal of Homotopy and Related Structures (JHRS) is a fully refereed international journal dealing with homotopy and related structures of mathematical and physical sciences. Journal of Homotopy and Related Structures is intended to publish papers on Homotopy in the broad sense and its related areas like Homological and homotopical algebra, K-theory, topology of manifolds, geometric and categorical structures, homology theories, topological groups and algebras, stable homotopy theory, group actions, algebraic varieties, category theory, cobordism theory, controlled topology, noncommutative geometry, motivic cohomology, differential topology, algebraic geometry.
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