Další formáty:
BibTeX
LaTeX
RIS
@inproceedings{950102, author = {Chimani, Markus and Hliněný, Petr}, address = {Gremany}, booktitle = {Automata, Languages and Programming 38th International Colloquium, ICALP 2011}, doi = {http://dx.doi.org/10.1007/978-3-642-22006-7_11}, editor = {Luca Aceto, Monika Henzinger and Jirí Sgall}, keywords = {crossing number; crossing minimization; planar insertion}, howpublished = {tištěná verze "print"}, language = {eng}, location = {Gremany}, isbn = {978-3-642-22005-0}, pages = {122-134}, publisher = {Springer}, title = {A Tighter Insertion-based Approximation of the Crossing Number}, url = {http://dx.doi.org/10.1007/978-3-642-22006-7_11}, year = {2011} }
TY - JOUR ID - 950102 AU - Chimani, Markus - Hliněný, Petr PY - 2011 TI - A Tighter Insertion-based Approximation of the Crossing Number PB - Springer CY - Gremany SN - 9783642220050 KW - crossing number KW - crossing minimization KW - planar insertion UR - http://dx.doi.org/10.1007/978-3-642-22006-7_11 L2 - http://dx.doi.org/10.1007/978-3-642-22006-7_11 N2 - Let $G$ be a planar graph and $F$ a set of additional edges not yet in $G$. The {\em multiple edge insertion} problem (MEI) asks for a drawing of $G+F$ with the minimum number of pairwise edge crossings, such that the subdrawing of $G$ is plane. As an exact solution to MEI is NP-hard for general $F$, we present the first approximation algorithm for MEI which achieves an additive approximation factor (depending only on the size of $F$ and the maximum degree of $G$) in the case of connected~$G$. Our algorithm seems to be the first directly implementable one in that realm, too, next to the single edge insertion. It is also known that an (even approximate) solution to the MEI problem would approximate the crossing number of the \emph{$F$-almost-planar graph} $G+F$, while computing the crossing number of $G+F$ exactly is NP-hard already when $|F|=1$. Hence our algorithm induces new, improved approximation bounds for the crossing number problem of $F$-almost-planar graphs, achieving constant-factor approximation for the large class of such graphs of bounded degrees and bounded size of $F$. ER -
CHIMANI, Markus a Petr HLINĚNÝ. A Tighter Insertion-based Approximation of the Crossing Number. In Luca Aceto, Monika Henzinger and Jirí Sgall. \textit{Automata, Languages and Programming 38th International Colloquium, ICALP 2011}. Gremany: Springer, 2011, s.~122-134. ISBN~978-3-642-22005-0. Dostupné z: https://dx.doi.org/10.1007/978-3-642-22006-7\_{}11.
|