Equivariant Eilenberg-Watts theorem for module coalgebras
Abstract
For coalgebras C and D, Takeuchi proved that the category of linear functors from MC to MD preserving small coproducts is equivalent to the category of C-D-bicomodules, where MC for a coalgebra C means the category of right C-comodules. We formulate and prove an equivariant version of this result for module coalgebras over a bialgebra. As an application, for a bialgebra H, we establish an equivalence of the 2-category of a particular class of module categories over the monoidal category MH and the 2-category of a particular class of module categories over the monoidal category HM of left H-modules.
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