Title of article
Hyperbolic spaces at large primes and a conjecture of Moore
Author/Authors
Stelzer، نويسنده , , Manfred، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2004
Pages
9
From page
667
To page
675
Abstract
A simply connected finite complex X is called elliptic if its rational homotopy Lie algebra is of finite dimension and hyperbolic otherwise. According to a conjecture of Moore, there exists an exponent for the p-torsion part of π∗(X) if and only if X is elliptic. In this note, it is shown that, provided the prime p is sufficiently large, a hyperbolic space with p-torsion free loop space homology has no exponent in the p-torsion of the homotopy groups. For a class of formal spaces, this result is obtained for every odd prime.
Keywords
Moore conjecture , Homotopy exponent , Hyperbolic space
Journal title
Topology
Serial Year
2004
Journal title
Topology
Record number
1545442
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