Improved lower bounds for the radio number of trees

Abstract Let G be a graph with diameter d. A radio labelling of G is a function f that assigns to each vertex with a non-negative integer such that the following holds for all vertices u , v : | f ( u ) − f ( v ) | ⩾ d + 1 − d ( u , v ) , where d ( u , v ) is the distance between u and v. The span of f is the absolute difference of the largest and smallest values in f ( V ) . The radio number of G is the minimum span of a radio labelling admitted by G. For trees, a general lower bound of the radio number was given by Liu [10] , which has been used to prove special families of trees whose radio number is equal to this bound [1] , [6] , [9] , [10] . In this article, we present improved lower bounds for some trees whose radio number exceeds Liu's lower bound. Some of these new bounds are sharp for special families of trees, including complete binary trees [9] and odd paths [11] . Moreover, using these new bounds, we extend the known results of Halasza and Tuza [6] on complete level-wise regular trees.

[1]  Olivier Togni,et al.  The Radio Antipodal and Radio Numbers of the Hypercube , 2011, Ars Comb..

[2]  W. K. Hale Frequency assignment: Theory and applications , 1980, Proceedings of the IEEE.

[3]  Frank Harary,et al.  Radio labelings of graphs , 2001 .

[4]  Sanming Zhou A channel assignment problem for optical networks modelled by Cayley graphs , 2004, Theor. Comput. Sci..

[5]  Paul Martinez,et al.  Radio numbers for generalized prism graphs , 2011, Discuss. Math. Graph Theory.

[6]  Sanming Zhou,et al.  Optimal radio labellings of complete m-ary trees , 2010, Discret. Appl. Math..

[7]  Zsolt Tuza,et al.  Distance-constrained labeling of complete trees , 2015, Discret. Math..

[8]  THE RADIO NUMBER OF Cn Cn , .

[9]  Sanming Zhou A distance-labelling problem for hypercubes , 2008, Discret. Appl. Math..

[10]  Gary Chartrand,et al.  A graph labeling problem suggested by FM channel restrictions , 2005 .

[11]  Daphne Der-Fen Liu,et al.  Optimal radio-k-labelings of trees , 2021, Eur. J. Comb..

[12]  Daphne Der-Fen Liu,et al.  Antipodal Labelings for Cycles , 2012, Ars Comb..

[13]  Sanming Zhou,et al.  Radio number of trees , 2017, Discret. Appl. Math..

[14]  Jerrold R. Griggs,et al.  Labelling Graphs with a Condition at Distance 2 , 1992, SIAM J. Discret. Math..

[15]  Pratima Panigrahi,et al.  On the radio number of toroidal grids , 2013, Australas. J Comb..

[16]  Daphne Der-Fen Liu Radio number for trees , 2008, Discret. Math..

[17]  Xuding Zhu,et al.  Multilevel Distance Labelings for Paths and Cycles , 2005, SIAM J. Discret. Math..