REGULAR PATTERNS, SUBSTITUDES, FEYNMAN CATEGORIES AND OPERADS

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REGULAR PATTERNS, SUBSTITUDES, FEYNMAN CATEGORIES AND OPERADS. / Batanin, Michael; Kock, Joachim; Weber, Mark.

In: Theory and Applications of Categories, Vol. 33, 2018, p. 148-192.

Research output: Contribution to journalJournal articleResearchpeer-review

Harvard

Batanin, M, Kock, J & Weber, M 2018, 'REGULAR PATTERNS, SUBSTITUDES, FEYNMAN CATEGORIES AND OPERADS', Theory and Applications of Categories, vol. 33, pp. 148-192.

APA

Batanin, M., Kock, J., & Weber, M. (2018). REGULAR PATTERNS, SUBSTITUDES, FEYNMAN CATEGORIES AND OPERADS. Theory and Applications of Categories, 33, 148-192.

Vancouver

Batanin M, Kock J, Weber M. REGULAR PATTERNS, SUBSTITUDES, FEYNMAN CATEGORIES AND OPERADS. Theory and Applications of Categories. 2018;33:148-192.

Author

Batanin, Michael ; Kock, Joachim ; Weber, Mark. / REGULAR PATTERNS, SUBSTITUDES, FEYNMAN CATEGORIES AND OPERADS. In: Theory and Applications of Categories. 2018 ; Vol. 33. pp. 148-192.

Bibtex

@article{cf0a8793d900471c98d858b05b729e8d,
title = "REGULAR PATTERNS, SUBSTITUDES, FEYNMAN CATEGORIES AND OPERADS",
abstract = "We show that the regular patterns of Getzler (2009) form a 2-category biequivalent to the 2-category of substitudes of Day and Street (2003), and that the Feynman categories of Kaufmann and Ward (2013) form a 2-category biequivalent to the 2-category of coloured operads (with invertible 2-cells). These biequivalences induce equivalences between the corresponding categories of algebras. There are three main ingredients in establishing these biequivalences. The first is a strictification theorem (exploiting Power's General Coherence Result) which allows to reduce to the case where the structure maps are identity-on-objects functors and strict monoidal. Second, we subsume the Getzler and Kaufmann-Ward hereditary axioms into the notion of Guitart exactness, a general condition ensuring compatibility between certain left Kan extensions and a given monad, in this case the free-symmetric-monoidal-category monad. Finally we set up a biadjunction between substitudes and what we call pinned symmetric monoidal categories, from which the results follow as a consequence of the fact that the hereditary map is precisely the counit of this biadjunction.",
keywords = "operads, symmetric monoidal categories, YONEDA STRUCTURES, ALGEBRA",
author = "Michael Batanin and Joachim Kock and Mark Weber",
year = "2018",
language = "English",
volume = "33",
pages = "148--192",
journal = "Theory and Applications of Categories",
issn = "1201-561X",
publisher = "Mount Allison University Department of Mathematics and Science",

}

RIS

TY - JOUR

T1 - REGULAR PATTERNS, SUBSTITUDES, FEYNMAN CATEGORIES AND OPERADS

AU - Batanin, Michael

AU - Kock, Joachim

AU - Weber, Mark

PY - 2018

Y1 - 2018

N2 - We show that the regular patterns of Getzler (2009) form a 2-category biequivalent to the 2-category of substitudes of Day and Street (2003), and that the Feynman categories of Kaufmann and Ward (2013) form a 2-category biequivalent to the 2-category of coloured operads (with invertible 2-cells). These biequivalences induce equivalences between the corresponding categories of algebras. There are three main ingredients in establishing these biequivalences. The first is a strictification theorem (exploiting Power's General Coherence Result) which allows to reduce to the case where the structure maps are identity-on-objects functors and strict monoidal. Second, we subsume the Getzler and Kaufmann-Ward hereditary axioms into the notion of Guitart exactness, a general condition ensuring compatibility between certain left Kan extensions and a given monad, in this case the free-symmetric-monoidal-category monad. Finally we set up a biadjunction between substitudes and what we call pinned symmetric monoidal categories, from which the results follow as a consequence of the fact that the hereditary map is precisely the counit of this biadjunction.

AB - We show that the regular patterns of Getzler (2009) form a 2-category biequivalent to the 2-category of substitudes of Day and Street (2003), and that the Feynman categories of Kaufmann and Ward (2013) form a 2-category biequivalent to the 2-category of coloured operads (with invertible 2-cells). These biequivalences induce equivalences between the corresponding categories of algebras. There are three main ingredients in establishing these biequivalences. The first is a strictification theorem (exploiting Power's General Coherence Result) which allows to reduce to the case where the structure maps are identity-on-objects functors and strict monoidal. Second, we subsume the Getzler and Kaufmann-Ward hereditary axioms into the notion of Guitart exactness, a general condition ensuring compatibility between certain left Kan extensions and a given monad, in this case the free-symmetric-monoidal-category monad. Finally we set up a biadjunction between substitudes and what we call pinned symmetric monoidal categories, from which the results follow as a consequence of the fact that the hereditary map is precisely the counit of this biadjunction.

KW - operads

KW - symmetric monoidal categories

KW - YONEDA STRUCTURES

KW - ALGEBRA

M3 - Journal article

VL - 33

SP - 148

EP - 192

JO - Theory and Applications of Categories

JF - Theory and Applications of Categories

SN - 1201-561X

ER -

ID: 331498515