Some Recent Papers
R. C. Brigham, F. R. McMorris, and R. P. Vitray, Tolerance competition graphs, Linear Algebra and Its Applications 217(1995) 41-52.
Ronald D. Dutton, Sirisha R. Medidi, and Robert C. Brigham, Changing and unchanging of the radius of a graph, Linear Algebra and Its Applications 217(1995) 67-82.
M. E. Bascuñán, S. Ruiz, R. C. Brigham, R. M. Caron, P. J Slater, and R. P. Vitray, On the additive bandwidth of graphs, Journal of Combinatorial Mathematics and Combinatorial Computing 18(1995) 129-144.
Ronald D. Dutton and Robert C. Brigham, On the radius and diameter of the clique graph, Discrete Mathematics 147(1995) 293-295.
R. C. Brigham, F. R. McMorris, and R. P. Vitray, Two-phi-tolerance competition graphs, Discrete Applied Mathematics 66(1996) 101-108.
Robert C. Brigham, Ronald D. Dutton, Frank Harary, and Teresa W. Haynes, On graphs having equal domination and codomination numbers, Utilitas Mathematica 50(1996) 53-64.
Robert C. Brigham, Richard M. Caron, Phyllis Z. Chinn, and Ralph P. Grimaldi, Tilings and Fibonacci numbers, Journal of Recreational Mathematics 28(1996-97) 276-283.
Ronald D. Dutton and Robert C. Brigham, Invariant relations involving the additive bandwidth, Journal of Combinatorial Mathematics and Combinatorial Computing 28(1997) 77-85.
Mary M. Miller, Robert C. Brigham, and Ronald D. Dutton, An equation involving the neighborhood (two-step) and line graphs, to appear in Ars Combinatoria.
Robert C. Brigham and Ronald D. Dutton, Pairs of maximal "almost" disjoint isomorphic subgraphs of spiders, to appear in Utilitas Mathematica.
Robert C. Brigham and Julie R. Carrington, Global domination, invited chapter in Domination in Graphs: Advanced Topics (T. W. Haynes, S. T. Hedetneimi, P. J. Slader Eds) Marcel Dekker, New York, 1998, pp. 301-320.
Robert C. Brigham, Julie R. Carrington, and Richard P. Vitray, Bipartite graphs and absolute difference tolerances, to appear in Ars Combinatoria.
Robert C. Brigham, Julie R. Carrington, and Richard P. Vitray, Connected graphs with maximum total domination number, to appear in Journal of Combinatorial Mathematics and Combinatorial Computing.