Deficiency of p-Class Tower Groups and Minkowski Units

Abstract

Let p be a prime. We define the deficiency of a finitely-generated pro-p group G to be r(G)-d(G) where d(G) is the minimal number of generators of G and r(G) is its minimal number of relations. For a number field K, let K be the maximal unramified p-extension of K, with Galois group G = Gal(K/K). In the 1960s, Shafarevich (and independently Koch) showed that the deficiency of G satisfies 0≤ Def( G) ≤ dim (OK×/(OK× )p), relating the deficiency of G to the p-rank of the unit group OK× of the ring of integers OK of K. In this work, we further explore connections between relations of the group G and the units in the tower K/K, especially their Galois module structure. In particular, under the assumption that K does not contain a primitive pth root of unity, we give an exact formula for Def( G) in terms of the number of independent Minkowski units in the tower. The method also allows us to infer more information about the relations of G, such as their depth in the Zassenhaus filtration, which in certain circumstances makes it easier to show that G is infinite. We illustrate how the techniques can be used to provide evidence for the expectation that the Shafarevich-Koch upper bound is "almost always" sharp.