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    • CommentRowNumber1.
    • CommentAuthorMike Shulman
    • CommentTimeAug 21st 2016
    • CommentRowNumber2.
    • CommentAuthorfastlane69
    • CommentTimeAug 21st 2016
    • (edited Aug 21st 2016)

    If I may be so bold, I think it is a bad idea to use ’virtual’ as part of the name.

    As I read it, the only nod to ’virtual’ in Virtual double category is :

    The relevant transformations are a “virtual” version of vertical transformations between ordinary double category

    and

    It is a generalized multicategory, in the sense of Hermida, Cruttwell-Shulman, and others, relative to the monad T T on graphs-internal-to-Cat whose algebras are double categories. This is the origin of the name “virtual double category,” in line with the general terminology “virtual T T-algebra” of Cruttwell-Shulman for such generalized multicategories.

    Thus if the only use of virtual here, as I read it, is that two things are “virtually the same” and if so, IMO, this will lead to confusion.

    Personally, as a physicist, ’virtual’ carries too much of the original “virtual particle” connotation: not ’real’ (i.e., virtual) but convenient for calculations.

    On top of that, from my programming days, “virtual reality”’ again emphasizes that this reality is not the ’real’ one but a virtual one.

    If this is the sense of virtual in these categories, that they are not ’real’ in some context, I apologize and I’ll read more carefully.

    But otherwise, based on these quotes…

    A virtual double category or fc fc-multicategory is a common generalization of a monoidal category, a bicategory, a double category, and a multicategory. […] Virtual double categories are related to double categories precisely as ordinary multicategories are related to monoidal categories (see generalized multicategory and tensor product).

    …something like “generalized double category” would be less confusing IMO.

    • CommentRowNumber3.
    • CommentAuthorfastlane69
    • CommentTimeAug 21st 2016
    • (edited Aug 21st 2016)

    Here again, for example:

    The profunctors between [virtual] double categories are a similar [“virtualization” of] the notion of double profunctor between double categories.

    If you change “virtualiztion” to generalization, you don’t need to use air-quotes and, as I read it, you preserve (my perceived) intent behind “virtualization”:

    The profunctors between [generalized] double categories are a similar [generalization on] the notion of double profunctor between double categories.

    • CommentRowNumber4.
    • CommentAuthorMike Shulman
    • CommentTimeAug 21st 2016

    The general principle of the name is that a “virtual TT-algebra” is close to, but not quite, a “real” TT-algebra. In other words, exactly what you want.

    The adjective “generalized” doesn’t convey any indication of in exactly what way something has been “generalized”, whereas by using a particular term of art we can be specific.

    • CommentRowNumber5.
    • CommentAuthorfastlane69
    • CommentTimeAug 22nd 2016
    • (edited Aug 22nd 2016)

    I understand your intent and this is a good lesson for me on using the world “generalized”; thanks for that.

    Just keep in mind that if a person familiar with Computer Science and/or Physics comes across this term, they may conflate among the various different definitions already in usage for ’virtual’, especially the existential context where ’virtual’ means “isn’t real” and “doesn’t exist”.

    • CommentRowNumber6.
    • CommentAuthorMike Shulman
    • CommentTimeOct 26th 2019

    Changed name to “augmented virtual double category” to match Koudenberg’s new choice of terminology.

    diff, v2, current

    • CommentRowNumber7.
    • CommentAuthormaxsnew
    • CommentTimeOct 28th 2019

    Since virtual double categories can be described as a generalized multicategory, can these augmented virtual double categories be described as kind of generalized polycategory?

    • CommentRowNumber8.
    • CommentAuthorMike Shulman
    • CommentTimeOct 28th 2019

    Yes! Except that generalized polycategories haven’t been defined yet…