Hopf measuring comonoids and enrichment
From MaRDI portal
Publication:4597587
DOI10.1112/plms.12064zbMath1405.16046arXiv1509.07632OpenAlexW3124061193MaRDI QIDQ4597587
Christina Vasilakopoulou, J. M. E. Hyland, Ignacio L. López Franco
Publication date: 13 December 2017
Published in: Proceedings of the London Mathematical Society (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1509.07632
Enriched categories (over closed or monoidal categories) (18D20) Hopf algebras and their applications (16T05) Coalgebras and comodules; corings (16T15)
Related Items (14)
Monoidal Grothendieck construction ⋮ V-universal Hopf algebras (co)acting on Ω-algebras ⋮ Generalizations of the Sweedler dual ⋮ Hopf monoids in varieties ⋮ On measurings of algebras over operads and homology theories ⋮ Functors between representation categories. Universal modules ⋮ Measurings of Hopf algebroids and morphisms in cyclic (co)homology theories ⋮ The finite dual coalgebra as a quantization of the maximal spectrum ⋮ Sweedler theory of monads ⋮ Oplax Hopf Algebras ⋮ Comonadic base change for enriched categories ⋮ Enriched duality in double categories: \(\mathcal{V}\)-categories and \(\mathcal{V}\)-cocategories ⋮ The coalgebraic enrichment of algebras in higher categories ⋮ Bialgebra coverings and transfer of structure
This page was built for publication: Hopf measuring comonoids and enrichment
