Distributive FCP extensions

Abstract

We are dealing with extensions of commutative rings R⊂eq S whose chains of the poset [R,S] of their subextensions are finite ( i.e. R⊂eq S has the FCP property) and such that [R,S] is a distributive lattice, that we call distributive FCP extensions. Note that the lattice [R,S] of a distributive FCP extension is finite. This paper is the continuation of our earlier papers where we studied catenarian and Boolean extensions. Actually, for an FCP extension, the following implications hold: Boolean ⇒ distributive ⇒ catenarian. A comprehensive characterization of distributive FCP extensions actually remains a challenge, essentially because the same problem for field extensions is not completely solved. Nevertheless, we are able to exhibit a lot of positive results for some classes of extensions. A main result is that an FCP extension R⊂eq S is distributive if and only if R⊂eq R is distributive, where R is the integral closure of R in S. A special attention is paid to distributive field extensions.

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