Let be a closed monoidal (V-enriched for some ) homotopical category, let denote the tensor unit of . Then the cospan category (same objects and cospans as morphisms) is -enriched, too.
An interval object is defined to be a cospan .
The pushout of this diagram satisfies is contractible (see co-span for this notation).
Let be a closed monoidal (V-enriched for some ) homotopical category, let denote the tensor unit of , let denote the interval object of , let be a pointed object of .
A direction for is defined to be a subobject of satisfying
(1) every map factoring over the point is a (generalized) element of .
(2) is closed under pushout.
A global (or just generalized) element of is called directed path in
A directed object is defined to be a pair consisting of an object of and a direction for .
A morphism of directed objects is defined to be a pair making
Let be -enriched, closed monoidal homotopical category, let denote the tensor unit of .
A directed-path-space objects is defined.