Convex Hull of Planar H-Polyhedra
Abstract
Suppose <Ai, ci> are planar (convex) H-polyhedra, that is, Ai ∈ Rni × 2 and ci ∈ Rni. Let Pi = \x ∈ R2 Aix ≤ ci \ and n = n1 + n2. We present an O(n n) algorithm for calculating an H-polyhedron <A, c> with the smallest P = \x ∈ R2 Ax ≤ c \ such that P1 P2 ⊂eq P.
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