Decorated Cospans at Jonathan Fu blog

Decorated Cospans. We describe a method of producing a symmetric. So, for any such functor f f, a decorated cospan of finite sets is a cospan of finite sets: Let be a category with finite colimits, writing its coproduct , and let be a braided monoidal category. We call dthe decoration on the cospan. This set f(n) f (n) is the set of decorations of the given kind that we can put on n n. ‘decorated cospan categories’, are simply the objects of c, while the morphisms are pairs comprising a cospan x !n y in ctogether with an. *actually, these decorated cospans are the morphisms of a bicategory, and a morphism in fcospan is an. Structured and decorated cospans are broadly applicable frameworks for building bicategories or double categories of open.

Structured and decorated cospans are broadly applicable frameworks for building bicategories or double categories of open. We call dthe decoration on the cospan. So, for any such functor f f, a decorated cospan of finite sets is a cospan of finite sets: This set f(n) f (n) is the set of decorations of the given kind that we can put on n n. ‘decorated cospan categories’, are simply the objects of c, while the morphisms are pairs comprising a cospan x !n y in ctogether with an. *actually, these decorated cospans are the morphisms of a bicategory, and a morphism in fcospan is an. We describe a method of producing a symmetric. Let be a category with finite colimits, writing its coproduct , and let be a braided monoidal category.

DECORATED COSPANS BRENDAN FONG

Decorated Cospans Structured and decorated cospans are broadly applicable frameworks for building bicategories or double categories of open. Let be a category with finite colimits, writing its coproduct , and let be a braided monoidal category. Structured and decorated cospans are broadly applicable frameworks for building bicategories or double categories of open. ‘decorated cospan categories’, are simply the objects of c, while the morphisms are pairs comprising a cospan x !n y in ctogether with an. So, for any such functor f f, a decorated cospan of finite sets is a cospan of finite sets: This set f(n) f (n) is the set of decorations of the given kind that we can put on n n. We describe a method of producing a symmetric. *actually, these decorated cospans are the morphisms of a bicategory, and a morphism in fcospan is an. We call dthe decoration on the cospan.

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