On the Order ofp-Groups of Abundance Zero

Let p be a fixed prime number. By a p-extension of fields, we understand a Galois extension with pro-p Galois group. If k is a number field, let k Žϱ. be the maximal unramified p-extension of k s k Ž0. , and put Ž Žϱ. . Ä Ž i. 4 Ž . Ž 0 .

We look at a competitor of the Erdos᎐Renyi models of random graphs, one ˝ẃ Ž .x proposed in E. Gilbert J. Soc. Indust. Appl. Math. 9:4, 533᎐543 1961 : given ␦ ) 0 and a metric space X of diameter ) ␦ , scatter n vertices at random on X and connect those of distance -␦ apart: we get a random graph G

Let S=(a 1 , a 2 , ..., a 2n&1 ) be a sequence of 2n&1 elements in an Abelian group G of order n (written additively). For a # G, let r(S, a) be the number of subsequences of length exactly n whose sum is a. Erdo s et al. [1] proved that r(S, 0) 1. In [2], Mann proved that if n (=p) is a prime, then