On completing three cyclic transversals to a latin square
Abstract
Let P be a partial latin square of prime order p>7 consisting of three cyclically generated transversals. Specifically, let P be a partial latin square of the form: \[ P=\(i,c+i,s+i),(i,c'+i,s'+i),(i,c''+i,s''+i) 0 ≤ i< p\ \] for some distinct c,c',c'' and some distinct s,s',s''. In this paper we show that any such P completes to a latin square which is diagonally cyclic.
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