Biequivalences in tricategories

Nick Gurski

We show that every internal biequivalence in a tricategory $T$ is part of a biadjoint biequivalence. We give two applications of this result, one for transporting monoidal structures and one for equipping a monoidal bicategory with invertible objects with a coherent choice of those inverses.

Keywords: biequivalence, biadjoint biequivalence, tricategory, monoidal bicategory

2000 MSC: Primary 18D05, 18D10 06F05, 06F07, 08B30

Theory and Applications of Categories, Vol. 26, 2012, No. 14, pp 349-384.

Published 2012-08-07.

http://www.tac.mta.ca/tac/volumes/26/14/26-14.dvi
http://www.tac.mta.ca/tac/volumes/26/14/26-14.ps
http://www.tac.mta.ca/tac/volumes/26/14/26-14.pdf
ftp://ftp.tac.mta.ca/pub/tac/html/volumes/26/14/26-14.dvi
ftp://ftp.tac.mta.ca/pub/tac/html/volumes/26/14/26-14.ps

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