Rational Homotopy Theory

Rational Homotopy Theory

AngličtinaEbook
Felix, Yves
Springer New York
EAN: 9781461301059
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as well as by the list of open problems in the final section of this monograph. The computational power of rational homotopy theory is due to the discovery by Quillen [135] and by Sullivan [144] of an explicit algebraic formulation. In each case the rational homotopy type of a topological space is the same as the isomorphism class of its algebraic model and the rational homotopy type of a continuous map is the same as the algebraic homotopy class of the correspond- ing morphism between models. These models make the rational homology and homotopy of a space transparent. They also (in principle, always, and in prac- tice, sometimes) enable the calculation of other homotopy invariants such as the cup product in cohomology, the Whitehead product in homotopy and rational Lusternik-Schnirelmann category. In its initial phase research in rational homotopy theory focused on the identi- of these models. These included fication of rational homotopy invariants in terms the homotopy Lie algebra (the translation of the Whitehead product to the homo- topy groups of the loop space OX under the isomorphism 11'+1 (X) ~ 1I.(OX , LS category and cone length. Since then, however, work has concentrated on the properties of these in- variants, and has uncovered some truly remarkable, and previously unsuspected phenomena. For example * If X is an n-dimensional simply connected finite CW complex, then either its rational homotopy groups vanish in degrees 2': 2n, or else they grow exponentially.
EAN 9781461301059
ISBN 146130105X
Typ produktu Ebook
Vydavatel Springer New York
Datum vydání 6. prosince 2012
Jazyk English
Země United States
Autoři Felix, Yves; Halperin, Stephen; Thomas, J.-C.
Série Graduate Texts in Mathematics