"Weakly closed" monoidal bicategories?

"Weakly closed" monoidal bicategories?

[Mike Stay]

In a closed symmetric monoidal bicategory, the categories
    Hom(A tensor B, C)
and
    Hom(A, hom(B, C))
are equivalent.  It occurred to me that one could weaken this
equivalence to a mere adjunction.  Looking for references, I found
Lars Birkedal's thesis where he considers "weakly closed partial
cartesian" bicategories.

Are there other references I should be aware of?  Thanks!
-- 
Mike Stay - metaweta@gmail.com
http://www.cs.auckland.ac.nz/~mike
http://reperiendi.wordpress.com


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Re: "Weakly closed" monoidal bicategories?

[Richard Garner]

Dear Mike,

This paper of Vincent Schmitt involves such a structure on the
2-category of symmetric monoidal categories. I don't think the abstract
structure of which this is an instance is made explicit though.

http://arxiv.org/abs/0711.0324

Richard

On Sat, May 3, 2014, at 01:40 AM, Mike Stay wrote:
> In a closed symmetric monoidal bicategory, the categories
>     Hom(A tensor B, C)
> and
>     Hom(A, hom(B, C))
> are equivalent.  It occurred to me that one could weaken this
> equivalence to a mere adjunction.  Looking for references, I found
> Lars Birkedal's thesis where he considers "weakly closed partial
> cartesian" bicategories.
>
> Are there other references I should be aware of?  Thanks!
> --
> Mike Stay - metaweta@gmail.com
> http://www.cs.auckland.ac.nz/~mike
> http://reperiendi.wordpress.com
>

[For admin and other information see: http://www.mta.ca/~cat-dist/ ]