Internal bialgebroid
In mathematics, an internal bialgebroid is a structure which abstracts the associative bialgebroid to the setup where the category of vector spaces is replaced by an abstract symmetric monoidal category admitting coequalizers commuting with the monoidal product.
See also
External links
- Gabriella Böhm, Internal bialgebroids, entwining structures and corings, in: Algebraic structures and their representations, 207–226, Contemp. Math. 376, Amer. Math. Soc. 2005. Cornell University Library, retrieved 11 September, 2017
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