G-structures on spheres

ČADEK, Martin and Michael CRABB. G-structures on spheres. Proceedings of the London mathematical society. Cambridge: Cambridge University Press, 2006, 93 (2006), No 3, p. 791-816. ISSN 0024-6115.

Basic information

Original name

G-structures on spheres

Name in Czech

G-struktury na sférách

Authors

ČADEK, Martin (203 Czech Republic, guarantor) and Michael CRABB (826 United Kingdom of Great Britain and Northern Ireland)

Edition

Proceedings of the London mathematical society, Cambridge, Cambridge University Press, 2006, 0024-6115

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Other information

Language

English

Type of outcome

Článek v odborném periodiku

Field of Study

10101 Pure mathematics

Country of publisher

United Kingdom of Great Britain and Northern Ireland

Confidentiality degree

není předmětem státního či obchodního tajemství

References:

URL

Impact factor

Impact factor: 0.902

RIV identification code

RIV/00216224:14310/06:00017053

Organization unit

Faculty of Science

UT WoS

000242006700009

Keywords in English

Principal bundle; reduction of the structure group; representations of classical Lie groups; K-theory; Weyl Dimension Formula; unstable Adams map

Tags

K-theory, principal bundle, unstable Adams map, Weyl Dimension Formula

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Abstract

V originále

A generalization of classical theorems on the existence of sections of real, complex and quaternionic Stiefel manifolds over spheres is proved. We obtain a complete list of Lie group homomorhisms which reduce the structure group G_n=SO(n), SU(n), Sp(n) in the principal fibre bundle over G_{n+1}/G_n.

In Czech

Práce popisuje zobecnění klasických vět o existenci řezů Stieflových variet. Podává seznam homomorfismů, které redukují strukturní grupu G_n=SO(n), SU(n), Sp(n) v hlavním bandlu nad G_{n+1}/G_n.

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Links

MSM0021622409, plan (intention)

Name: Matematické struktury a jejich fyzikální aplikace Investor: Ministry of Education, Youth and Sports of the CR, Mathematical structures and their physical applications