Algebraic integers and distributions on the N-torus

fields, the problem is essentially a planar lattice point problem (cf. ZAGIER [17]). To this, the deep results of HUXLEY [3], [4] can be applied to get For cubic fields, W. MULLER [12] proved that ## 43 - (h the class number), using a deep exponential sum technique due to KOLESNIK [7]. every n

Let A(x)=a d x d + } } } +a 0 be the minimal polynomial of : over Z. Recall that the denominator of :, denoted den(:), is defined as the least positive integer n for which n: is an algebraic integer. It is well known that den(:)|a d . In this paper we study the density of algebraic numbers : of fixe

Let A be a real quadratic algebra of dimension s 3 which satisfies the basic relations of hypercomplex systems. For a large positive parameter X, let A(X) denote the number of squares : 2 with : # A, : integral, and all s components of : 2 lying in the interval [&X, X]. With particular regard to Cay