Ring extensions of length 2

Abstract

We characterize extensions of commutative rings R⊂ S such that R⊂ T is minimal for each R-subalgebra T of S with T≠ R,S. This property is equivalent to R⊂ S has length 2. Such extensions are either pointwise minimal or simple. We are able to compute the number of subextensions of R⊂ S. Besides commutative algebra considerations, our main result is a consequence of the recently introduced by van Hoeij et al. concept of principal subfields of a finite separable field extension. As a corollary of this paper, we get that simple extensions of length 2 have FIP.