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On several varieties of cacti and their relations
Ralph M Kaufmann
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Algebraic & Geometric Topology 5
(2005) 237–300
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Abstract
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Motivated by string topology and the arc operad, we introduce the
notion of quasi-operads and consider four (quasi)-operads which are
different varieties of the operad of cacti. These are cacti without
local zeros (or spines) and cacti proper as well as both varieties
with fixed constant size one of the constituting loops. Using the
recognition principle of Fiedorowicz, we prove that spineless cacti
are equivalent as operads to the little discs operad. It turns out
that in terms of spineless cacti Cohen's Gerstenhaber structure and
Fiedorowicz' braided operad structure are given by the same explicit
chains. We also prove that spineless cacti and cacti are homotopy
equivalent to their normalized versions as quasi-operads by showing
that both types of cacti are semi-direct products of the quasi-operad
of their normalized versions with a re-scaling operad based on
R>0. Furthermore, we introduce the notion of
bi-crossed products of quasi-operads and show that the cacti proper
are a bi-crossed product of the operad of cacti without spines and the
operad based on the monoid given by the circle group S1. We also
prove that this particular bi-crossed operad product is homotopy
equivalent to the semi-direct product of the spineless cacti with the
group S1. This implies that cacti are equivalent to the framed
little discs operad. These results lead to new CW models for the
little discs and the framed little discs operad.
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Keywords
cacti, (quasi-)operad, string topology,
loop space, bi-crossed product, (framed) little discs,
quasi-fibration
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Mathematical Subject Classification
Primary: 55P48
Secondary: 16S35, 55P35
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Publication
Received: 9 January 2004
Revised: 16 March 2005
Accepted: 30 March 2005
Published: 15 April 2005
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