By Curry Howard correspondence, all theorems and lemmas are types and proof objects are values. As an example:
Theorem test: 0 <= 0.
Proof.
omega. Qed.
When I do, Check test. Coq's output is:
test
: 0 <= 0
But when I check the type of "<=", it is nat -> nat -> Prop. That means (0 <= 0) is of type Prop. Does this mean that the type 'test' is a subtype of Prop? In general, are theorem and lemma identifiers subtypes of Prop?