The overlay of lower envelopes and its applications
Let F and G be two collections of a total of n (possibly partially defined) bivariate, algebraic functions of constant maximum degree. The minimization diagrams of F, G are the planar maps obtained by the xy-projections of the lower envelopes of F, G, respectively. We show that the combinatorial complexity of the overlay of the minimization diagrams of F and of G is O (n(2+epsilon)), for any epsilon > 0. This result has several applications: (i) a near-quadratic upper bound on the complexity of the region in S-space enclosed between the lower envelope of one such collection of functions and the upper envelope of another collection; (ii) an efficient and simple divide-and-conquer algorithm for constructing lower envelopes in three dimensions; and (iii) a near-quadratic upper bound on the complexity of the space of all plane transversals of a collection of simply shaped convex sets in three dimensions.
- Publisher
- SPRINGER VERLAG
- Issue Date
- 1996-01
- Language
- English
- Article Type
- Article
- Keywords
DAVENPORT-SCHINZEL SEQUENCES; COMPUTATIONAL GEOMETRY; ARRANGEMENTS; BOUNDS; CURVES; SETS
- Citation
DISCRETE COMPUTATIONAL GEOMETRY, v.15, no.1, pp.1 - 13
- ISSN
- 0179-5376
- Appears in Collection
- CS-Journal Papers(저널논문)
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