Manhattan-Metric Voronoi Diagram

In Manhattan Voronoi Diagram, the bisector defined with Manhattan metric and hence the set V_M = {V(p₁), . . ., V(p_n)} defined by the equation 1 with equation 2 (p=1) gives a generalized Voronoi diagram.

We call the set V_Mthe Manhattan-Metric Voronoi Diagram generated by Manhattan Voronoi Diagram in brief, and the set V(p_i) the Manhattan metric Voronoi polygon associated with p_i.

(Fig 3.7.3 p 187)

Properties

The set V(p_i) defined by Minkowski metric with the Manhattan metric is not empty, and forms a Manhattan Voronoi polygon.

The V(p_i) is not necessarily convex, but it always star-shaped w.r.t. the generator p_i.
Every edge of V(p_i) consists of at most three straight lines that are parallel to the x₁-axis, x₂-axis, or diagonal lines within angle π/4 3π/4.
The V(p_i) is infinite if p_i is on the boundary of the convex hull of p, but not conversely.

Reference

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F.K. Hwang , "An O (nlogn) algorithm for rectilinear minimal spanning trees", Journal of the ACM, 26(1979), 177-182.
D.T. Lee, "Two dimensional Voronoi Diagram in the Lp-metric, Journal of the ACM", (1980)27, 604-618.
D. T Lee and C. K. Wong, "Voronoi Diagram in L₁ (L_∞) metrics with 2-dimensional storage applications", SIAM Journal of Computing, 9(1980), 200-211.