Topological categories related to Fredholm operators: I. Classifying spaces

In 1970s Segal outlined proofs of two theorems relating spaces of Fredholm and self-adjoint Fredholm operators with Quillen's constructions used to define higher algebraic K-theory. In the present paper we provide detailed proofs of these theorems of Segal (different from the ones outlined by Segal) and then transplant some further ideas of Quillen to the real of Fredholm and self-adjoint Fredholm operators. The main results may be considered as partial analogues of the equivalence of Quillen's two definition of higher algebraic K-theory. Along the way we relate spaces of Fredholm and self-adjoint Fredholm operators with more concrete classifying spaces. These results are partially motivated by applications to the index theory in a related paper.