The finiteness obstruction for loop spaces

Dietrich Notbohm

Type: Article

Publication Date: 1999-11-01

Citations: 3

DOI: https://doi.org/10.1007/s000140050110

Abstract

For finitely dominated spaces, Wall constructed a finiteness obstruction, which decides whether a space is equivalent to a finite CW-complex or not. It was conjectured that this finiteness obstruction always vanishes for quasi finite H-spaces, that are H-spaces whose homology looks like the homology of a finite CW-complex. In this paper we prove this conjecture for loop spaces. In particular, this shows that every quasi finite loop space is actually homotopy equivalent to a finite CW-complex.

Locations

Commentarii Mathematici Helvetici - View - PDF

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Works Cited by This (20)

Action	Title	Year	Authors
+	Elements of Homotopy Theory	1978	George W. Whitehead
+	Product splittings for $p$-compact groups	1995	W. G. Dwyer Clarence Wilkerson
+	Classifying Spaces of Compact Lie Groups and Finite Loop Spaces	1995	Dietrich Notbohm
+	Wall's Finiteness Obstruction	1995	Guido Mislin
+	Kernels of maps between classifying spaces	1994	Dietrich Notbohm
+	Universal geometric examples for transfer maps in algebraic K- and L-theory	1981	Erik Kjær Pedersen
+	Wall's obstruction for nilpotent spaces	1975	Guido Mislin
+	Finiteness conditions for <i>CW</i> complexes. Il	1966	C. T. C. Wall
+ PDF Chat	The obstruction to the finiteness of the total space of a fibration.	1981	Karel Ehrlich
+	Whitehead transfers forS 1-bundles, an algebraic description	1981	Hans J. Munkholm Erik Kjær Pedersen