论文信息 - Dynamic algorithms for monotonic interval scheduling problem

Dynamic algorithms for monotonic interval scheduling problem

We investigate dynamic algorithms for the interval scheduling problem. We focus on the case when the set of intervals is monotonic. This is when no interval properly contains another interval. We provide two data structures for representing the intervals that allow efficient insertion, removal and various query operations. The first dynamic algorithm, based on the data structure called compatibility forest, runs in amortised time O ( log 2 ? n ) for insertion and removal and O ( log ? n ) for query. The second dynamic algorithm, based on the data structure called linearised tree, runs in time O ( log ? n ) for insertion, removal and query. We discuss differences and similarities of these two data structures through theoretical and experimental results.

[1] Feifeng Zheng,et al. Online interval scheduling: randomized and multiprocessor cases , 2008, J. Comb. Optim..

[2] Éva Tardos,et al. Algorithm design , 2005 .

[3] Pinar Heggernes,et al. A new representation of proper interval graphs with an application to clique-width , 2009, Electron. Notes Discret. Math..

[4] Frank Nielsen,et al. Maintenance of a Piercing Set for Intervals with Applications , 2000, Algorithmica.

[5] Frits C. R. Spieksma,et al. Interval scheduling: A survey , 2007 .

[6] Richard J. Lipton,et al. Online interval scheduling , 1994, SODA '94.

[7] Ronald L. Rivest,et al. Introduction to Algorithms , 1990 .

[8] Derek G. Corneil,et al. A simple 3-sweep LBFS algorithm for the recognition of unit interval graphs , 2004, Discret. Appl. Math..

[9] Xiaotie Deng,et al. Linear-Time Representation Algorithms for Proper Circular-Arc Graphs and Proper Interval Graphs , 1996, SIAM J. Comput..

[10] Robert E. Tarjan,et al. A data structure for dynamic trees , 1981, STOC '81.

[11] Haim Kaplan,et al. Dynamic rectangular intersection with priorities , 2003, STOC '03.

[12] Robert E. Tarjan,et al. Self-adjusting binary search trees , 1985, JACM.

[13] Jiamou Liu,et al. Dynamising Interval Scheduling: The Monotonic Case , 2013, IWOCA.

[14] Kurt Mehlhorn,et al. Data Structures and Algorithms 3: Multi-dimensional Searching and Computational Geometry , 2012, EATCS Monographs on Theoretical Computer Science.