Publications

  • M. Ferrara, R. Gould and C. Suffel, Spanning Tree Edge Densities, Congressus Numeratium 154 (2002), pp 155-163.
  • M. Ferrara, V. Rodl and Y. Kohayakawa, Distance Graphs on the Integers, Combinatorics, Probability and Computing 14 (2005), 107-131.
  • M. Ferrara, R. Gould, G. Tansey and T. Whalen, On H-Linked Graphs , Graphs and Combinatorics 22 (2006), pp 217-224.
  • M. Ferrara, Graphic Sequences with a Realization Containing a Union of Arbitrary Cliques, Graphs and Combinatorics 23 (2007) pp. 263-269..
  • M. Ferrara, R. Gould and J. Schmitt, Graphic Sequences with a Realizaton Containing a Friendship Graph, to appear in ARS Combinatoria.
  • M. Ferrara, R. Gould and S. Hartke. The Structure and Existence of 2-Factors in Iterated Line Graphs , to appear in Discuss. Math. Graph Theory.
  • A. Busch, M. Ferrara and N. Kahl, Generalizing D-Graphs , to appear in Discrete Appl. Math.
  • M. Ferrara, R. Gould, G. Tansey and T. Whalen, On H-Immersions, to appear in J. Graph Theory.

    Submitted Papers

  • M. Ferrara, R. Gould, G. Tansey and T. Whalen, Degree-Sum Conditions for Bipartite Graphs to Contain Disjoint Hamiltonian Cycles .
  • M. Ferrara and J. Schmitt, A Lower Bound for Potentially H-Graphic Sequences .
  • G. Chen, M. Ferrara, R. Gould and J. Schmitt, Graphic Sequences with a Realization Containing a Complete Multipartite Subgraph .
  • J. Cho, M. Ferrara, R. Gould and J. Schmitt, A Difference Set Approach to Gregarious Decompositions of Multipartite Graphs .
  • M. Ferrara, M. Jacobson, J. Schmitt and M. Siggers, Potentially H-Bigraphic Sequences .
  • R. Faudree, M. Ferrara, R. Gould and M. Jacobson, tK_p-saturated Graphs of Minimum Size .
  • M. Ferrara, J. Gilbert, M. Jacobson and T. Whalen, Irregularity Strength of Digraphs .
  • M. Ferrara, A. Harris, M. Jacobson, Hamiltonian Cycles Avoiding Sets of Edges in a Graph .
  • M. Ferrara, E. Gethner, C. Lee, P. Wallis The Irregular Chromatic Number of Paths and Cycles.
  • M. Ferrara and J. Schmitt, Using Edge Swaps to Prove the Erdos-Jacobson-Lehel Conjecture.

    Notes - Conference Proceedings

  • M. Ferrara and J. Schmitt, An Erdos-Stone Type Conjecture for Graphic Sequences, Electronic Notes in Discrete Mathematics (Proceedings of 6th Czech-Slovak International Symposium, Prague, 2006), Volume 28 (2007) 131-135.