ZIB

Hits per page

hits 1 - 3 | 3 hits

Sorting

Electronic Resource

Geometric Pattern Matching in d -Dimensional Space (1999)

Chew, L. P. ; Dor, D. ; Efrat, A. ; [et al.]

Springer

Discrete & computational geometry 21 (1999), S. 257-274

add to mindlist on the mindlist

Details

ISSN: 1432-0444

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract. We show that, using the L ∞ metric, the minimum Hausdorff distance under translation between two point sets of cardinality n in d -dimensional space can be computed in time O(n (4d-2)/3 log 2 n) for 3 〈 d $\leq$ 8, and in time O(n 5d/4 log 2 n) for any d 〉 8 . Thus we improve the previous time bound of O(n 2d-2 log 2 n) due to Chew and Kedem. For d=3 we obtain a better result of O(n 3 log 2 n) time by exploiting the fact that the union of n axis-parallel unit cubes can be decomposed into O(n) disjoint axis-parallel boxes. We prove that the number of different translations that achieve the minimum Hausdorff distance in d -space is $\Theta(n^{\floor{3d/2}})$ . Furthermore, we present an algorithm which computes the minimum Hausdorff distance under the L 2 metric in d -space in time $O(n^{\ceil{3d/2}+1 +\delta})$ , for any δ 〉 0.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/PL00009420

Permalink

Library	Location	Call Number	Volume/Issue/Year	Availability

Others were also interested in ...

Paper (German National Licenses)

Fulltext

Electronic Resource

On the Number of Regular Vertices of the Union of Jordan Regions (2001)

Aronov, B. ; Efrat, A. ; Halperin, D. ; [et al.]

Springer

Discrete & computational geometry 25 (2001), S. 203-220

add to mindlist on the mindlist

Details

ISSN: 1432-0444

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract. Let \C be a collection of n Jordan regions in the plane in general position, such that each pair of their boundaries intersect in at most s points, where s is a constant. If the boundaries of two sets in \C cross exactly twice, then their intersection points are called regular vertices of the arrangement \A(\C) . Let R(\C) denote the set of regular vertices on the boundary of the union of \C . We present several bounds on |R(\C)| , depending on the type of the sets of \C . (i) If each set of \C is convex, then |R(\C)|=O(n 1.5+\eps ) for any \eps〉0 . (ii) If no further assumptions are made on the sets of \C , then we show that there is a positive integer r that depends only on s such that |R(\C)|=O(n 2-1/r ) . (iii) If \C consists of two collections \C 1 and \C 2 where \C 1 is a collection of m convex pseudo-disks in the plane (closed Jordan regions with the property that the boundaries of any two of them intersect at most twice), and \C 2 is a collection of polygons with a total of n sides, then |R(\C)|=O(m 2/3 n 2/3 +m +n) , and this bound is tight in the worst case.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/s00454-001-0001-7

Permalink

Library	Location	Call Number	Volume/Issue/Year	Availability

Others were also interested in ...

Paper (German National Licenses)

Fulltext

Electronic Resource

On the Complexity of the Union of Fat Convex Objects in the Plane (2000)

Efrat, A. ; Sharir, M.

Springer

Discrete & computational geometry 23 (2000), S. 171-189

add to mindlist on the mindlist

Details

ISSN: 1432-0444

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science , Mathematics

Notes: Abstract. We prove a near-linear bound on the combinatorial complexity of the union of n fat convex objects in the plane, each pair of whose boundaries cross at most a constant number of times.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/PL00009494

Permalink

Library	Location	Call Number	Volume/Issue/Year	Availability

Others were also interested in ...

Paper (German National Licenses)

Fulltext

hits 1 - 3 | 3 hits