On Point Sets in Vector Spaces over Finite Fields That Determine Only Acute Angle Triangles
Abstract
For three points u,v and w in the n-dimensional space qn over the finite field q of q elements we give a natural interpretation of an acute angle triangle defined by this points. We obtain an upper bound on the size of a set such that all triples of distinct points u, v, w ∈ define acute angle triangles. A similar question in the real space n dates back to P. Erd os and has been studied by several authors.
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