Simultaneous visibility in the algebraic lattice
Abstract
Let K be a number field with ring of integers O. Two lattice points x, y∈ Om with m≥ 2 are said to be visible from one another if ((xi-yi),…, (xm-ym))=O, where (xi-yi) is the ideal generated by xi-yi. Let S⊂ Om be a finite set. For K=Q, the asymptotic density of the set of lattice points, visible from all points of S, was studied by several authors. For general number fields K, however, the asymptotic density has been studied only in the special case S=\(0,…,0)\. Our main result establishes the corresponding density formula for a number field K whose ring of integers O is a principal ideal domain, for all finite sets S with |S|≥ 2.
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