On a generalization of the normal basis in abelian algebraic number fields

Let p be a fixed odd prime number and k an imaginary abelian field containing a primitive p th root `p of unity. Let k Âk be the cyclotomic Z p -extension and LÂk the maximal unramified pro-p abelian extension. We put where E is the group of units of k . Let X=Gal(LÂk ) and Y=Gal(L & NÂk ), and let

Let f (x, y) be a polynomial with rational coefficients, and let E be a number field. We prove estimates for the number of positive integers n T such that some root : of f (n, y)=0 satisfies E/Q(:). The estimates are uniform with respect to E and, provided E satisfies natural necessary conditions, t

We consider t-designs with \*=1 (generalized Steiner systems) for which the block size is not necessarily constant. An inequality for the number of blocks is derived. For t=2, this inequality is the well known De Bruijn Erdo s inequality. For t>2 it has the same order of magnitude as the Wilson Petr

We consider certain regular algebras of global dimension four that map surjectively onto the two-Veronese of a regular algebra of global dimension three on two generators. We also study the point modules.