http://orcid.org/0000-0002-5380-5692
References
- Chabert, J.-L., 1999. Newton’s methods, 169–197. Berlin, Heidelberg: Springer Berlin Heidelberg.
- Florian Heinz and Ralf Hartmut Güting, 2016. Robust high-quality interpolation of regions to moving regions. GeoInformatica, 20 (3), 385–413. doi:10.1007/s10707-015-0240-z
- Forlizzi, L., et al. A data model and data structures for moving objects databases. In W. Chen, J.F. Naughton, and P.A. Bernstein, editors, SIGMOD Conference, pages 319–330. ACM, 2000.
- Güting, R.H., Behr, T., and Düntgen, C. 2013. Trajectory databases. In: C. Renso, S. Spaccapietra, and E. Zimányi, editors. Mobility data: modeling, management, and understanding. New York: Cambridge University Press, 42–61.
- Güting, R.H., Behr, T., and Düntgen, C., 2010. SECONDO: a platform for moving objects database research and for publishing and integrating re- search implementations. IEEE Data Engineering Bulletin, 33 (2), 56–63.
- Güting, R.H., et al., 2000. Schneider, and Michalis Vazirgiannis. A foundation for representing and querying moving objects. ACM Transactions Database Systems, 25 (1), 1–42. doi:10.1145/352958.352963
- Güting, R.H. and Schneider, M., 2005. Moving objects databases. San Francisco, CA: Morgan Kaufmann.
- Matos, L., Moreira, J., and Carvalho, A., 2012. June. A spatiotemporal extension for dealing with moving objects with extent in oracle 11g. SIGAPP Applications Computation Reviews, 12 (2), 7–17. doi:10.1145/2340416
- McKenney, M. and Webb, J., 2010. Extracting moving regions from spatial data. In: D. Agrawal, et al., editors. GIS. New York: ACM, 438–441.
- McKenney, M. and Frye, R., 2015. Generating moving regions from snapshots of complex regions, ACM Transactions Spatial Algorithms and Systems, 1 (1), 4. 1–4:30. doi:10.1145/2774220
- McKenney, M., Shelby, R., and Bagga, S., 2017. Implementing set operations over moving regions using the component moving region model. GeoInformatica, 21 (2), 323–350. doi:10.1007/s10707-016-0259-9
- Razbani, M.A., 2015. Global root bracketing method with adaptive mesh refinement. Applied Mathematics and Computation, 268, 628–635. doi:10.1016/j.amc.2015.06.121
- Shamos, M.I. Computational geometry. 1979.
- Tøssebro, E. and Güting, R.H., 2001. Creating representations for continuously moving regions from observations. In: C.S. Jensen, et al., editors. SSTD, volume 2121 of lecture notes in computer science. London, UK: Springer-Verlag, 321–344.