Homotopy groups of spheres

Results: 50



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11REMARKS ON MOTIVIC HOMOTOPY THEORY OVER ALGEBRAICALLY CLOSED FIELDS PO HU, IGOR KRIZ AND KYLE ORMSBY Abstract. We discuss certain calculations in the 2-complete motivic stable homotopy category over an algebraically clos

REMARKS ON MOTIVIC HOMOTOPY THEORY OVER ALGEBRAICALLY CLOSED FIELDS PO HU, IGOR KRIZ AND KYLE ORMSBY Abstract. We discuss certain calculations in the 2-complete motivic stable homotopy category over an algebraically clos

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

Language: English - Date: 2010-10-12 22:16:22
12AN INTRODUCTION TO THE CATEGORY OF SPECTRA N. P. STRICKLAND 1. Introduction Early in the history of homotopy theory, people noticed a number of phenomena suggesting that it would be convenient to work in a context where

AN INTRODUCTION TO THE CATEGORY OF SPECTRA N. P. STRICKLAND 1. Introduction Early in the history of homotopy theory, people noticed a number of phenomena suggesting that it would be convenient to work in a context where

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Source URL: neil-strickland.staff.shef.ac.uk

Language: English - Date: 2011-06-24 12:01:03
13The Projection Median of a Set of Points in R2 Stephane Durocher∗ David Kirkpatrick† Kimberling triangle centre X], or any combination of Fermat-Steiner-Torricelli-Weber point. An

The Projection Median of a Set of Points in R2 Stephane Durocher∗ David Kirkpatrick† Kimberling triangle centre X], or any combination of Fermat-Steiner-Torricelli-Weber point. An

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Source URL: www.cccg.ca

Language: English - Date: 2005-07-31 13:55:52
14X(n) is a Hopf-Galois extension of X(n − 1) Jonathan Beardsley September 18, 2014 1

X(n) is a Hopf-Galois extension of X(n − 1) Jonathan Beardsley September 18, 2014 1

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Source URL: math.jhu.edu

Language: English - Date: 2014-09-18 13:34:56
15TWO-CHANNEL FILTER BANKS D. Stephen G. Pollock University of Leicester In this lecture, we will describe the structure of the two-channel filter bank, which is the basis of a dyadic wavelets analysis. Once the architect

TWO-CHANNEL FILTER BANKS D. Stephen G. Pollock University of Leicester In this lecture, we will describe the structure of the two-channel filter bank, which is the basis of a dyadic wavelets analysis. Once the architect

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Source URL: www.le.ac.uk

Language: English - Date: 2014-12-15 16:40:04
16THE STABLE FREE RANK OF SYMMETRY OF PRODUCTS OF SPHERES BERNHARD HANKE A BSTRACT. A well known conjecture in the theory of transformation groups states that if p is a prime and (Z/p)r acts freely on a product of k sphere

THE STABLE FREE RANK OF SYMMETRY OF PRODUCTS OF SPHERES BERNHARD HANKE A BSTRACT. A well known conjecture in the theory of transformation groups states that if p is a prime and (Z/p)r acts freely on a product of k sphere

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

Language: English - Date: 2013-12-05 22:03:02
17ON THE EXISTENCE OF A v232 -SELF MAP ON M (1, 4) AT THE PRIME 2 M. BEHRENS1 , M. HILL, M.J. HOPKINS2 , AND M. MAHOWALD Abstract. Let M (1) be the mod 2 Moore spectrum. J.F. Adams proved that M (1) admits a minimal v1 -se

ON THE EXISTENCE OF A v232 -SELF MAP ON M (1, 4) AT THE PRIME 2 M. BEHRENS1 , M. HILL, M.J. HOPKINS2 , AND M. MAHOWALD Abstract. Let M (1) be the mod 2 Moore spectrum. J.F. Adams proved that M (1) admits a minimal v1 -se

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Source URL: www-math.mit.edu

Language: English - Date: 2008-08-12 14:15:56
18THE STABLE FREE RANK OF SYMMETRY OF PRODUCTS OF SPHERES BERNHARD HANKE A BSTRACT. A well known conjecture in the theory of transformation groups states that if p is a prime and (Z/p)r acts freely on a product of k sphere

THE STABLE FREE RANK OF SYMMETRY OF PRODUCTS OF SPHERES BERNHARD HANKE A BSTRACT. A well known conjecture in the theory of transformation groups states that if p is a prime and (Z/p)r acts freely on a product of k sphere

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

Language: English - Date: 2013-12-05 22:03:02
19Brunnian subgroups of mapping class groups and braid groups A. J. Berrick, E. Hanbury and J. Wu Abstract This is the second of a pair of papers on the Delta-group structure on the braid and mapping class groups of a surf

Brunnian subgroups of mapping class groups and braid groups A. J. Berrick, E. Hanbury and J. Wu Abstract This is the second of a pair of papers on the Delta-group structure on the braid and mapping class groups of a surf

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Source URL: www.math.nus.edu.sg

Language: English - Date: 2012-09-04 15:21:12
20Geometry & Topology XX (20XX) 1001–[removed]Combinatorial group theory and the homotopy groups of finite complexes

Geometry & Topology XX (20XX) 1001–[removed]Combinatorial group theory and the homotopy groups of finite complexes

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Source URL: www.math.nus.edu.sg

Language: English - Date: 2012-10-05 01:48:42