+∞-w\0-generated field extensions

Abstract

In this note, we continue to be interested in the relationship that connects the restricted distribution of finitude at the local level of intermediate fields of a purely inseparable extension K/k to the absolute or global finitude of K/k. In " w\0-generated field extensions,Arch. Math. 47, (1986), 410-412", JK Deveney constructed an example of modular extension K/k called w\0 -generated such that for any proper subfield L of K/k , L is finite over k, and for every n ∈ N, we have [kp- n K: k] = p2n . This example has proved to be extremely useful in the construction of other examples of w\0-generated extensions. In particular, we prolong the w\0-generated to an extension of unspecified finite size.However, when K/k is of unbounded size, we show that any modular extension of unbounded exponent admits a proper subextension of unbounded exponent. This brings us to study the w\0-generated in the restricted sense. In addition, with the aim of extending the w\0-generated to a purely inseparable extension of unbounded size, we propose other generalizations.