On the DJL conjecture for order 6
Abstract
In 1994 Drew, Johnson and Loewy conjectured that for n 4, the cp-rank of any n× n completely positive matrices is at most n2/4. Recently this conjecture has been proved for n=5 and disproved for n 7, leaving the case n=6 open. We make a step toward proving the conjecture for n=6. We show that if A is a 6× 6 completely positive matrix that is orthogonal to an exceptional extremal copositive matrix, then the cp-rank of A is at most 9.
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