论文信息 - Properties of a q-Analogue of Zero Forcing

Properties of a q-Analogue of Zero Forcing

Zero forcing is a combinatorial game played on a graph where the goal is to start with all vertices unfilled and to change them to filled at minimal cost. In the original variation of the game there were two options. Namely, to fill any one single vertex at the cost of a single token; or if any currently filled vertex has a unique non-filled neighbor, then the neighbor is filled for free. This paper investigates a $q$-analogue of zero forcing which introduces a third option involving an oracle. Basic properties of this game are established including determining all graphs which have minimal cost $1$ or $2$ for all possible $q$, and finding the zero forcing number for all trees when $q=1$.

[1] Shaun M. Fallat,et al. Zero forcing parameters and minimum rank problems , 2010, 1003.2028.

[2] W. Haemers. Zero forcing sets and minimum rank of graphs , 2008 .

[3] Steve Butler,et al. Using variants of zero forcing to bound the inertia set of a graph , 2015 .

[4] Michael Young,et al. Positive semidefinite zero forcing , 2013, Linear Algebra and its Applications.

[5] Sarah Meyer,et al. Propagation time for zero forcing on a graph , 2012, Discret. Appl. Math..

[6] Darren D. Row. A technique for computing the zero forcing number of a graph with a cut-vertex , 2012 .

[7] Boting Yang. Fast-mixed searching and related problems on graphs , 2013, Theor. Comput. Sci..

[8] Shaun M. Fallat,et al. Minimum Rank, Maximum Nullity, and Zero Forcing Number of Graphs , 2014 .