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  • 1
    Electronic Resource
    Electronic Resource
    Dynamic fractional cascading (1990)
    Springer
    Algorithmica 5 (1990), S. 215-241 
    Details
    ISSN: 1432-0541
    Keywords: Computational geometry ; Linear lists ; Dynamic data structures ; Amortized complexity
    Source: Springer Online Journal Archives 1860-2000
    Topics: Computer Science , Mathematics
    Notes: Abstract The problem of searching for a key in many ordered lists arises frequently in computational geometry. Chazelle and Guibas recently introduced fractional cascading as a general technique for solving this type of problem. In this paper we show that fractional cascading also supports insertions into and deletions from the lists efficiently. More specifically, we show that a search for a key inn lists takes timeO(logN +n log logN) and an insertion or deletion takes timeO(log logN). HereN is the total size of all lists. If only insertions or deletions have to be supported theO(log logN) factor reduces toO(1). As an application we show that queries, insertions, and deletions into segment trees or range trees can be supported in timeO(logn log logn), whenn is the number of segments (points).
    Type of Medium: Electronic Resource
    URL: http://dx.doi.org/10.1007/BF01840386
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    Paper (German National Licenses)
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  • 2
    Electronic Resource
    Electronic Resource
    Approximate motion planning and the complexity of the boundary of the union of simple geometric figures (1992)
    Springer
    Algorithmica 8 (1992), S. 391-406 
    Details
    ISSN: 1432-0541
    Keywords: Computational geometry ; Motion planning ; Boundary complexity ; Combinatorial geometry ; Analysis of algorithms
    Source: Springer Online Journal Archives 1860-2000
    Topics: Computer Science , Mathematics
    Notes: Abstract We study rigid motions of a rectangle amidst polygonal obstacles. The best known algorithms for this problem have a running time of Ω(n 2), wheren is the number of obstacle corners. We introduce thetightness of a motion-planning problem as a measure of the difficulty of a planning problem in an intuitive sense and describe an algorithm with a running time ofO((a/b · 1/ɛcrit + 1)n(logn)2), wherea ≥b are the lengths of the sides of a rectangle and ɛcrit is the tightness of the problem. We show further that the complexity (= number of vertices) of the boundary ofn bow ties (see Figure 1) isO(n). Similar results for the union of other simple geometric figures such as triangles and wedges are also presented.
    Type of Medium: Electronic Resource
    URL: http://dx.doi.org/10.1007/BF01758853
    Library Location Call Number Volume/Issue/Year Availability
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    Paper (German National Licenses)
    Fulltext
  • 3
    Book
    Book
    LEDA: a platform for combinatorial and geometric computing (1999)
    Cambridge :Cambridge Univ. Pr.,
    Details
    Title: LEDA: a platform for combinatorial and geometric computing
    Author: Mehlhorn, Kurt
    Contributer: Näher, Stefan
    Publisher: Cambridge :Cambridge Univ. Pr.,
    Year of publication: 1999
    Pages: 1018 S.
    Type of Medium: Book
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