Monoids of moduli spaces of manifolds

Institut for Matematiske Fag

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Monoids of moduli spaces of manifolds. / Galatius, Søren; Randal-Williams, Oscar.

I: Geometry & Topology, Bind 14, 2010, s. 1243-1302.

Publikation: Bidrag til tidsskrift › Tidsskriftartikel › Forskning › fagfællebedømt

Harvard

Galatius, S & Randal-Williams, O 2010, 'Monoids of moduli spaces of manifolds', Geometry & Topology, bind 14, s. 1243-1302. https://doi.org/10.2140/gt.2010.14.1243

APA

Galatius, S., & Randal-Williams, O. (2010). Monoids of moduli spaces of manifolds. Geometry & Topology, 14, 1243-1302. https://doi.org/10.2140/gt.2010.14.1243

Vancouver

Galatius S, Randal-Williams O. Monoids of moduli spaces of manifolds. Geometry & Topology. 2010;14:1243-1302. https://doi.org/10.2140/gt.2010.14.1243

Author

Galatius, Søren ; Randal-Williams, Oscar. / Monoids of moduli spaces of manifolds. I: Geometry & Topology. 2010 ; Bind 14. s. 1243-1302.

Bibtex

@article{63ee9760d7d911df825b000ea68e967b,

title = "Monoids of moduli spaces of manifolds",

abstract = "We study categories of d–dimensional cobordisms from the perspective of Tillmann [Invent. Math. 130 (1997) 257–275] and Galatius, Madsen, Tillman and Weiss [Acta Math. 202 (2009) 195–239]. There is a category C¿ of closed smooth(d - 1)–manifolds and smooth d–dimensional cobordisms, equipped with generalised orientations specified by a map¿: X ¿ BO(d). The main result of [Acta Math. 202 (2009) 195–239] is a determination of the homotopy type of the classifying space BC¿. The goal of the present paper is a systematic investigation of subcategoriesD¿C¿ with the property that BD¿ BC¿, the smaller such D the better.We prove that in most cases of interest, D can be chosen to be a homotopy commutative monoid. As a consequence we prove that the stable cohomology of many moduli spaces of surfaces with ¿–structure is the cohomology of the infinite loop space of a certain Thom spectrum MT¿. This was known for certain special ¿, using homological stability results; our work is independent of such results and covers many more cases.",

keywords = "Faculty of Science",

author = "S{\o}ren Galatius and Oscar Randal-Williams",

note = "Paper id:: 10.2140/gt.2010.14.1243",

year = "2010",

doi = "10.2140/gt.2010.14.1243",

language = "English",

volume = "14",

pages = "1243--1302",

journal = "Geometry & Topology",

issn = "1465-3060",

publisher = "Geometry & Topology Publications",

}

RIS

TY - JOUR

T1 - Monoids of moduli spaces of manifolds

AU - Galatius, Søren

AU - Randal-Williams, Oscar

N1 - Paper id:: 10.2140/gt.2010.14.1243

PY - 2010

Y1 - 2010

N2 - We study categories of d–dimensional cobordisms from the perspective of Tillmann [Invent. Math. 130 (1997) 257–275] and Galatius, Madsen, Tillman and Weiss [Acta Math. 202 (2009) 195–239]. There is a category C¿ of closed smooth(d - 1)–manifolds and smooth d–dimensional cobordisms, equipped with generalised orientations specified by a map¿: X ¿ BO(d). The main result of [Acta Math. 202 (2009) 195–239] is a determination of the homotopy type of the classifying space BC¿. The goal of the present paper is a systematic investigation of subcategoriesD¿C¿ with the property that BD¿ BC¿, the smaller such D the better.We prove that in most cases of interest, D can be chosen to be a homotopy commutative monoid. As a consequence we prove that the stable cohomology of many moduli spaces of surfaces with ¿–structure is the cohomology of the infinite loop space of a certain Thom spectrum MT¿. This was known for certain special ¿, using homological stability results; our work is independent of such results and covers many more cases.

AB - We study categories of d–dimensional cobordisms from the perspective of Tillmann [Invent. Math. 130 (1997) 257–275] and Galatius, Madsen, Tillman and Weiss [Acta Math. 202 (2009) 195–239]. There is a category C¿ of closed smooth(d - 1)–manifolds and smooth d–dimensional cobordisms, equipped with generalised orientations specified by a map¿: X ¿ BO(d). The main result of [Acta Math. 202 (2009) 195–239] is a determination of the homotopy type of the classifying space BC¿. The goal of the present paper is a systematic investigation of subcategoriesD¿C¿ with the property that BD¿ BC¿, the smaller such D the better.We prove that in most cases of interest, D can be chosen to be a homotopy commutative monoid. As a consequence we prove that the stable cohomology of many moduli spaces of surfaces with ¿–structure is the cohomology of the infinite loop space of a certain Thom spectrum MT¿. This was known for certain special ¿, using homological stability results; our work is independent of such results and covers many more cases.

KW - Faculty of Science

U2 - 10.2140/gt.2010.14.1243

DO - 10.2140/gt.2010.14.1243

M3 - Journal article

VL - 14

SP - 1243

EP - 1302

JO - Geometry & Topology

JF - Geometry & Topology

SN - 1465-3060

ER -

ID: 22502949