An elementary proof for a generalization of a Pohst's inequality

Abstract

Let Pn(y1,…,yn):= Π1≤ i<j≤ n( 1 -yiyj) and Pn:= (y1,…,yn)Pn(y1,…,yn) where the supremum is taken over the n-ples (y1,…,yn) of real numbers satisfying 0 <|y1| < |y2|< ·s < |yn|. We prove that Pn ≤ 2 n/2 for every n, i.e., we extend to all n the bound that Pohst proved for n≤ 11. As a consequence, the bound for the absolute discriminant of a totally real field in terms of its regulator is now proved for every degree of the field.

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