Triples and quadruples of consecutive squares or non-squares in a finite field
Abstract
Let be the finite field of odd prime power order q, We find explicit expressions for the number of triples \-1,,+1 \ of consecutive non-zero squares in and similarly for the number of triples of consecutive non-square elements. A key ingredient is the evaluation of Jacobsthal sums over general finite fields by Katre and Rajwade. This extends results of Monzingo(1985) to non-prime fields. Curiously, the same machinery alows the evaluation of the number of consecutive quadruples \ -1, ,+1, +2\ of square and non-squares over , when q is a power of 5.
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