Computing the minimum distance of the C(π_3,6) polar Orthogonal Grassmann code with elementary methods
The polar orthogonal Grassmann code C(π_3,6) is the linear code associated to the Grassmann embedding of the Dual Polar space of Q^+(5,q). In this manuscript we study the minimum distance of this embedding. We prove that the minimum distance of the polar orthogonal Grassmann code C(π_3,6) is q^3-q^3 for q odd and q^3 for q even. Our technique is based on partitioning the orthogonal space into different sets such that on each partition the code C(π_3,6) is identified with evaluations of determinants of skewβsymmetric matrices. Our bounds come from elementary algebraic methods counting the zeroes of particular classes of polynomials. We expect our techniques may be applied to other polar Grassmann codes.
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