Long paths in the distance graph over large subsets of vector spaces over finite fields
Abstract
Let E ⊂ Fqd, the d-dimensional vector space over a finite field with q elements. Construct a graph, called the distance graph of E, by letting the vertices be the elements of E and connect a pair of vertices corresponding to vectors x,y ∈ E by an edge if ||x-y||=(x1-y1)2+…+(xd-yd)2=1. We shall prove that if the size of E is sufficiently large, then the distance graph of E contains long non-overlapping paths and vertices of high degree.
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