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Higher-order
representation stability and ordered configuration spaces of
manifolds
Jeremy Miller and Jennifer C H Wilson |
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Geometry & Topology 23 (2019) 2519–2591
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Abstract |
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Using the language of twisted skew-commutative algebras, we define secondary representation stability, a stability pattern in the unstable homology of spaces that are representation stable in the sense of Church, Ellenberg and Farb (2015). We show that the rational homology of configuration spaces of ordered points in noncompact manifolds satisfies secondary representation stability. While representation stability for the homology of configuration spaces involves stabilizing by introducing a point “near infinity”, secondary representation stability involves stabilizing by introducing a pair of orbiting points — an operation that relates homology groups in different homological degrees. This result can be thought of as a representation-theoretic analogue of secondary homological stability in the sense of Galatius, Kupers and Randal-Williams (2018). In the course of the proof we establish some additional results: we give a new characterization of the homology of the complex of injective words, and we give a new proof of integral representation stability for configuration spaces of noncompact manifolds, extending previous results to nonorientable manifolds. |
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Keywords
representation stability, secondary representation
stability, configuration spaces, twisted commutative
algebras, homological stability, secondary homological
stability, complex of injective words, arc resolution
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Mathematical Subject Classification 2010
Primary: 18A25, 55R40, 55R80, 55U10
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References |
Publication
Received: 13 March 2018
Revised: 21 January 2019
Accepted: 23 February 2019
Published: 13 October 2019
Proposed: Jesper Grodal
Seconded: Anna Wienhard, Ralph Cohen
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Authors |
| Jeremy Miller | |
| Department of Mathematics Purdue University West Lafayette, IN United States |
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| Jennifer C H Wilson | |
| Department of Mathematics University of Michigan Ann Arbor, MI United States |
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