Optimal Tristance Anticodes in Certain Graphs
Abstract
For z1,z2,z3 ∈ n, the tristance d3(z1,z2,z3) is a generalization of the L1-distance on n to a quantity that reflects the relative dispersion of three points rather than two. A tristance anticode d of diameter d is a subset of n with the property that d3(z1,z2,z3) ≤ d for all z1,z2,z3 ∈ d. An anticode is optimal if it has the largest possible cardinality for its diameter d. We determine the cardinality and completely classify the optimal tristance anticodes in 2 for all diameters d 1. We then generalize this result to two related distance models: a different distance structure on 2 where d(z1,z2) = 1 if z1,z2 are adjacent either horizontally, vertically, or diagonally, and the distance structure obtained when 2 is replaced by the hexagonal lattice A2. We also investigate optimal tristance anticodes in 3 and optimal quadristance anticodes in 2, and provide bounds on their cardinality. We conclude with a brief discussion of the applications of our results to multi-dimensional interleaving schemes and to connectivity loci in the game of Go.
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