Online Dominating Set

This paper is devoted to the online dominating set problem and its variants. We believe the paper represents the first systematic study of the effect of two limitations of online algorithms: making irrevocable decisions while not knowing the future, and being incremental, i.e., having to maintain solutions to all prefixes of the input. This is quantified through competitive analyses of online algorithms against two optimal algorithms, both knowing the entire input, but only one having to be incremental. We also consider the competitive ratio of the weaker of the two optimal algorithms against the other. We consider important graph classes, distinguishing between connected and not necessarily connected graphs. For the classic graph classes of trees, bipartite, planar, and general graphs, we obtain tight results in almost all cases. We also derive upper and lower bounds for the class of bounded-degree graphs. From these analyses, we get detailed information regarding the significance of the necessary requirement that online algorithms be incremental. In some cases, having to be incremental fully accounts for the online algorithm's disadvantage.

[1]  Joan Boyar,et al.  The Seat Reservation Problem , 1999, Algorithmica.

[2]  Vasek Chvátal,et al.  A Greedy Heuristic for the Set-Covering Problem , 1979, Math. Oper. Res..

[3]  D. Koenig Theorie Der Endlichen Und Unendlichen Graphen , 1965 .

[4]  Brenda S. Baker,et al.  Approximation algorithms for NP-complete problems on planar graphs , 1983, 24th Annual Symposium on Foundations of Computer Science (sfcs 1983).

[5]  Fred B. Schneider,et al.  A Theory of Graphs , 1993 .

[6]  Claude Berge,et al.  The theory of graphs and its applications , 1962 .

[7]  Stephan Eidenbenz,et al.  Online Dominating Set , 2018, Algorithmica.

[8]  Richard M. Karp,et al.  Reducibility Among Combinatorial Problems , 1972, 50 Years of Integer Programming.

[9]  Peter J. Slater,et al.  Fundamentals of domination in graphs , 1998, Pure and applied mathematics.

[10]  L. Vietoris Theorie der endlichen und unendlichen Graphen , 1937 .

[11]  Wen-Guey Tzeng,et al.  On-Line Algorithms for the Dominating Set Problem , 1997, Inf. Process. Lett..

[12]  Michael R. Fellows,et al.  FIXED-PARAMETER TRACTABILITY AND COMPLETENESS , 2022 .

[13]  Vaduvur Bharghavan,et al.  Routing in ad-hoc networks using minimum connected dominating sets , 1997, Proceedings of ICC'97 - International Conference on Communications.

[14]  Rolf Niedermeier,et al.  Fixed Parameter Algorithms for DOMINATING SET and Related Problems on Planar Graphs , 2002, Algorithmica.

[15]  Robert E. Tarjan,et al.  Amortized efficiency of list update and paging rules , 1985, CACM.

[16]  Ding-Zhu Du,et al.  Connected Dominating Set: Theory and Applications , 2012 .

[17]  Allan Borodin,et al.  Online computation and competitive analysis , 1998 .

[18]  Anna R. Karlin,et al.  Competitive snoopy caching , 1986, 27th Annual Symposium on Foundations of Computer Science (sfcs 1986).

[19]  C. L. Liu,et al.  Introduction to Combinatorial Mathematics. , 1971 .

[20]  F. Harary,et al.  The theory of graphs and its applications , 1963 .

[21]  Ermelinda DeLaViña,et al.  On Total Domination in Graphs , 2012 .

[22]  Marek Chrobak,et al.  Two-Bounded-Space Bin Packing Revisited , 2011, ESA.

[23]  Jirí Sgall,et al.  Online Colored Bin Packing , 2014, WAOA.