The minimum rank problem over finite fields
classification
🧮 math.CO
keywords
minimumrankconnectionfiniteproblemprojectiveresultsapplying
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The structure of all graphs having minimum rank at most k over a finite field with q elements is characterized for any possible k and q. A strong connection between this characterization and polarities of projective geometries is explained. Using this connection, a few results in the minimum rank problem are derived by applying some known results from projective geometry.
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