In COQ the type prod (with one constructor pair) corresponds to cartesian product and the type sig (with one constructor exist) to dependent sum but how is described the fact that the cartesian product is a particular case of dependent sum? I wonder there is a link between prod and sig, for instance some definitional equality but I don't find it explicitely in the reference manual.
As a matter of fact, the type
From a meta-theoretic point of view, prod is just a special case of sigT where your
They can not be definitionally equal though, since they are different types. You could show a bijection:
But that's not very interesting... :)
A product is the special case of a dependent sum precisely when the dependent sum is isomorphic to the common product type.
Consider the traditional summation of a series whose terms do not depend on the index: the summation of a series of