Metric spaces in chess and international chess pieces graph diameters
Abstract
This paper aims to study the graph radii and diameters induced by the k-dimensional versions of the well-known six international chess pieces on every finite \n × n × … × n\ ⊂eq Zk lattice since they originate as many interesting metric spaces for any proper pair (n,k). For this purpose, we finally discuss a mathematically consistent generalization of all the planar FIDE chess pieces to an appropriate k-dimensional environment, finding (for any k ∈ Z+) the exact values of the graph radii and diameters of the k-rook, k-king, k-bishop, and the corresponding values for the 3-queen, 3-knight, and 3-pawn. We also provide tight bounds for the graph radii and diameters of the k-queen, k-knight, and k-pawn, holding for any k ≥ 4.
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