Thom space

Results: 39



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11699 Documenta Math. Thom Spectra that Are Symmetric Spectra

699 Documenta Math. Thom Spectra that Are Symmetric Spectra

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Source URL: www.math.uiuc.edu

Language: English - Date: 2009-12-31 04:42:00
12TOPOLOGICAL HERMITIAN COBORDISM PO HU AND IGOR KRIZ 1. Introduction A decade ago, the authors [5] studied Real cobordism M R, an RO(Z/2)graded Z/2-equivariant spectrum discovered by Landweber [9], which is related to com

TOPOLOGICAL HERMITIAN COBORDISM PO HU AND IGOR KRIZ 1. Introduction A decade ago, the authors [5] studied Real cobordism M R, an RO(Z/2)graded Z/2-equivariant spectrum discovered by Landweber [9], which is related to com

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Source URL: www.math.lsa.umich.edu

Language: English - Date: 2010-10-12 22:05:03
13THOM MAYNE DESIGNS POSTER FOR CERSAIE 2008 “Architecture is becoming more fluid. The standard is no longer the square tile only. Formal language emerges from lines of force and space develops fluidly in response to ra

THOM MAYNE DESIGNS POSTER FOR CERSAIE 2008 “Architecture is becoming more fluid. The standard is no longer the square tile only. Formal language emerges from lines of force and space develops fluidly in response to ra

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Source URL: www.italytile.com

Language: English - Date: 2010-06-24 11:11:32
14M U is a Hopf-Galois extension of M SU Jonathan Beardsley September 12, 2014 Recall the commutative S-algebras M SU and M U , the Thom spectra of oriented complex bordism and complex bordism respectively. Also recall tha

M U is a Hopf-Galois extension of M SU Jonathan Beardsley September 12, 2014 Recall the commutative S-algebras M SU and M U , the Thom spectra of oriented complex bordism and complex bordism respectively. Also recall tha

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Source URL: math.jhu.edu

Language: English - Date: 2014-09-12 08:53:40
15Configuration space integrals (Bott & Taubes) Pontrjagin–Thom construction Product structure on homology of knot space (Budney & F. Cohen) Product structure and homotopy-theoretic Bott–Taubes classes A homotopy-theo

Configuration space integrals (Bott & Taubes) Pontrjagin–Thom construction Product structure on homology of knot space (Budney & F. Cohen) Product structure and homotopy-theoretic Bott–Taubes classes A homotopy-theo

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Source URL: math.ucr.edu

Language: English - Date: 2009-11-13 13:04:04
16Antarctic Automatic Weather Stations Field Report forGeorge A. Weidner Jonathan Thom John Cassano Space Science and Engineering Center

Antarctic Automatic Weather Stations Field Report forGeorge A. Weidner Jonathan Thom John Cassano Space Science and Engineering Center

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Source URL: ice.ssec.wisc.edu

Language: English - Date: 2013-05-28 11:33:08
17Thom Mayne 2005 Laureate Essay An Essay on Thom Mayne By Lebbeus Woods Lebbeus Woods is an architect and teacher who has known Thom Mayne since they shared space in

Thom Mayne 2005 Laureate Essay An Essay on Thom Mayne By Lebbeus Woods Lebbeus Woods is an architect and teacher who has known Thom Mayne since they shared space in

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Source URL: www.pritzkerprize.com

Language: English - Date: 2011-10-25 13:50:38
18GEOMETRIC VERSUS HOMOTOPY THEORETIC EQUIVARIANT BORDISM BERNHARD HANKE A BSTRACT. By results of L¨offler and Comeza˜na, the Pontrjagin-Thom map from geometric G-equivariant bordism to homotopy theoretic equivariant bor

GEOMETRIC VERSUS HOMOTOPY THEORETIC EQUIVARIANT BORDISM BERNHARD HANKE A BSTRACT. By results of L¨offler and Comeza˜na, the Pontrjagin-Thom map from geometric G-equivariant bordism to homotopy theoretic equivariant bor

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Source URL: www.math.uni-augsburg.de

Language: English - Date: 2013-12-05 22:03:01
19CYCLES, SUBMANIFOLDS, AND STRUCTURES ON NORMAL BUNDLES C. BOHR, B. HANKE, AND D. KOTSCHICK Abstract. We give explicit examples of degree 3 cohomology classes not Poincar´e dual to submanifolds, and discuss the realisabi

CYCLES, SUBMANIFOLDS, AND STRUCTURES ON NORMAL BUNDLES C. BOHR, B. HANKE, AND D. KOTSCHICK Abstract. We give explicit examples of degree 3 cohomology classes not Poincar´e dual to submanifolds, and discuss the realisabi

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Source URL: www.math.uni-augsburg.de

Language: English - Date: 2013-12-05 22:03:00
20PROJECTIVE PRODUCT SPACES DONALD M. DAVIS Abstract. Let n = (n1 , . . . , nr ). The quotient space Pn := S n1 × · · · × S nr /(x ∼ −x) is what we call a projective product space. We determine the integral cohomo

PROJECTIVE PRODUCT SPACES DONALD M. DAVIS Abstract. Let n = (n1 , . . . , nr ). The quotient space Pn := S n1 × · · · × S nr /(x ∼ −x) is what we call a projective product space. We determine the integral cohomo

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Source URL: www.lehigh.edu

Language: English - Date: 2009-08-24 07:19:56