Every small 𝒮 l -enriched category is Morita equivalent to an 𝒮 l -monoid.

Mesablishvili, Bachuki

Theory and Applications of Categories [electronic only] (2004)

  • Volume: 13, page 169-171
  • ISSN: 1201-561X

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Mesablishvili, Bachuki. "Every small -enriched category is Morita equivalent to an -monoid.." Theory and Applications of Categories [electronic only] 13 (2004): 169-171. <http://eudml.org/doc/125874>.

@article{Mesablishvili2004,
author = {Mesablishvili, Bachuki},
journal = {Theory and Applications of Categories [electronic only]},
keywords = {sup-lattice; Sl-category; Morita equivalence; separable category},
language = {eng},
pages = {169-171},
publisher = {Mount Allison University, Department of Mathematics and Computer Science, Sackville},
title = {Every small -enriched category is Morita equivalent to an -monoid.},
url = {http://eudml.org/doc/125874},
volume = {13},
year = {2004},
}

TY - JOUR
AU - Mesablishvili, Bachuki
TI - Every small -enriched category is Morita equivalent to an -monoid.
JO - Theory and Applications of Categories [electronic only]
PY - 2004
PB - Mount Allison University, Department of Mathematics and Computer Science, Sackville
VL - 13
SP - 169
EP - 171
LA - eng
KW - sup-lattice; Sl-category; Morita equivalence; separable category
UR - http://eudml.org/doc/125874
ER -

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