Date: Tue, 4 Feb 1997 13:29:59 -0400 (AST) Subject: question on functors adjoint to their dual Date: Tue, 4 Feb 1997 16:44:39 GMT From: Hayo Thielecke I am interested in the following situation: a contravariant functor adjoint to its own dual, with the unit and counit being the same morphism, but _not_ an iso. The canonical example is the contravariant internal hom on a cartesian (or just symmetric monoidal) closed category, [(_) -> A] for some object A. My question is: is this typical, or are there (interesting) examples of such adjunctions that do not come from exponentials? Thanks, Hayo Thielecke Date: Wed, 5 Feb 1997 11:37:26 -0400 (AST) Subject: Re: question on functors adjoint to their dual Date: Tue, 4 Feb 1997 15:44:58 -0500 (EST) From: Fred E.J. Linton At 01:29 PM 2/4/97 -0400, you wrote: >I am interested in the following situation: a contravariant functor >adjoint to its own dual, with the unit and counit being the same >morphism, but _not_ an iso. > >The canonical example is the contravariant internal hom on a cartesian >(or just symmetric monoidal) closed category, [(_) -> A] for some >object A. > >My question is: is this typical ... ? I think it *is* typical: if we call the functor in question F , and if we write J for the unit object, then we should learn easily that F will just be [(_) -> F(J)] , i.e., F(J) itself will serve as your A . -- FEJ Linton