The Pell sequence and cyclotomic matrices involving squares over finite fields
Abstract
In this paper, by some arithmetic properties of the Pell sequence and some p-adic tools, we study certain cyclotomic matrices involving squares over finite fields. For example, let 1=s1,s2,·s,s(q-1)/2 be all the nonzero squares over Fq, where q=pf is an odd prime power with q7. We prove that the matrix Bq((q-3)/2)=[(si+sj)(q-3)/2]2 i,j (q-1)/2 is a singular matrix whenever f2. Also, for the case q=p, we show that Bp((p-3)/2)=0 Qp 2p2Z, where Qp is the p-th term of the companion Pell sequence \Qi\i=0∞ defined by Q0=Q1=2 and Qi+1=2Qi+Qi-1.
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