Saved in:
Bibliographic Details
Main Author: Iwase, Norio
Format: Preprint
Published: 2012
Subjects:
Online Access:https://arxiv.org/abs/1211.5741
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866916949285404672
author Iwase, Norio
author_facet Iwase, Norio
contents A higher associativity was introduced by Jim Stasheff in [Sta63] with higher coherence conditions and now becomes one of the most important structures on spaces and algebras. He also claims that the condition on unit can be weakened, using James retractile arguments [Jam60], while the proof given in [Sta63] for the equivalence of two definitions is not very clear for us. We had been puzzled for years, and decided to prove it in a different way by constructing an $A_{m}$-structure. To justify that our construction is natural, we bring our ideas into the theory of an internal precategory which is a weak version of Aguiar's internal category [Agu97]. Using that construction, we show the equivalence of two definitions under the `loop-like' condition. That condition is not necessary to manipulate higher forms using retractile arguments as is performed in [Sta63], but is necessary to construct an $A_{m}$-structure from the given $A_{m}$-form with {\em strict-unit} as is mentioned in Stasheff [Sta70].
format Preprint
id arxiv_https___arxiv_org_abs_1211_5741
institution arXiv
publishDate 2012
record_format arxiv
spellingShingle Associahedra, Multiplihedra and units in $A_{\infty}$ form
Iwase, Norio
Algebraic Topology
55P48 (Primary) 18D20, 18D40, 18M75, 55R05, 55R35 (Secondary)
A higher associativity was introduced by Jim Stasheff in [Sta63] with higher coherence conditions and now becomes one of the most important structures on spaces and algebras. He also claims that the condition on unit can be weakened, using James retractile arguments [Jam60], while the proof given in [Sta63] for the equivalence of two definitions is not very clear for us. We had been puzzled for years, and decided to prove it in a different way by constructing an $A_{m}$-structure. To justify that our construction is natural, we bring our ideas into the theory of an internal precategory which is a weak version of Aguiar's internal category [Agu97]. Using that construction, we show the equivalence of two definitions under the `loop-like' condition. That condition is not necessary to manipulate higher forms using retractile arguments as is performed in [Sta63], but is necessary to construct an $A_{m}$-structure from the given $A_{m}$-form with {\em strict-unit} as is mentioned in Stasheff [Sta70].
title Associahedra, Multiplihedra and units in $A_{\infty}$ form
topic Algebraic Topology
55P48 (Primary) 18D20, 18D40, 18M75, 55R05, 55R35 (Secondary)
url https://arxiv.org/abs/1211.5741