Quo vadis, graph theory? : a source book for challenges and directions

Author(s)

Bibliographic Information

Quo vadis, graph theory? : a source book for challenges and directions

edited by John Gimbel, John W. Kennedy and Louis V. Quintas

(Annals of discrete mathematics, 55)

North-Holland, 1993

Available at  / 43 libraries

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Note

Papers from an international meeting held at the University of Alaska Fairbanks, Alaska in August, 1990

"Quo vadis, graph theory? was also the title used for An International Conference on the Future of Graph Theory held at Universty of Alaska Fairbanks, August 1990"--p. viii

Includes bibliographical references and index

Description and Table of Contents

Description

Graph theory, as a recognized discipline, is a relative newcomer to mathematics. The first formal paper is found in the work of Leonard Euler in 1736. In recent years the subject has grown so rapidly that in today's literature, graph theory papers abound with mathematical developments and significant applications. As with any academic field, it is good to step back occasionally and ask "Where is all this activity taking us?", "What are the outstanding fundamental problems?", "What are the next important steps to take?" In short, "Quo vadis, graph theory?". The contributors to this volume aim, together, to provide a comprehensive reference source for future directions and open questions in the field.

Table of Contents

  • Whither graph theory?, W.T. Tutte
  • the future of graph theory, B. Bollobas
  • new directions in graph theory (with an emphasis on the role of applications), F.S. Roberts
  • a survey of (m,k)-colorings, M. Frick
  • numerical decks of trees, F. Gavril et al
  • the complexity of colouring by infinite vertex transitive graphs, B. Bauslaugh
  • rainbow subgraphs in edge-colourings of complete graphs, P. Erdos and Z. Tuza
  • graphs with special distance properties, M. Lewinter
  • probability models for random multigraphs with applications in cluster analysis, E.A.J. Godehardt
  • solved and unsolved problems in chemical graph theory, A.T. Balaban
  • detour distance in graphs, G. Chartrand et al
  • integer-distance graphs, R.P. Grimaldi
  • toughness and the cycle structure of graphs, D. Bauer and E, Schmeichel
  • the Birkhoff-Lewis equations for graph-colourings, W.T. Tutte
  • the complexity of knots, D.J.A. Welsh
  • the impact of F-polynomials in graph theory, E.J. Farrell
  • a note on well-covered graphs, V. Chvatal and P.J. Slater
  • cycle covers and cycle decomposition of graphs, C.-Q. Zhang
  • matching extensions and productos of graphs, J. Liu and Q. Yu
  • prospects for graph theory algorithms, R.C. Read
  • the state of the three colour problem, R. Steinberg
  • ranking planar embeddings using PQ-trees, A. Karabeg
  • some problems and results in cochromatic theory, P. Erdos and J. Gimbel
  • from random graphs to graph theory, A. Rucinski
  • matching and vertex packing - how "hard" are they?, M.D. Plummer
  • the competition number and its variants, S.-R. Kim
  • which double starlike trees span ladders?, M. Lewinter and W.F. Widulski
  • the random f-graph process, K.T. Balinska and L.V. Quintas
  • quo vadis, random graph theory?, E.M. Palmer
  • exploratory statistical analysis of networks, O. Frank and K. Norwicki
  • the Hamiltonian decomposition of certain circulant graphs, J. Liu
  • discovery-method teaching in graph theory, P.Z. Chinn.

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Details

  • NCID
    BA19842491
  • ISBN
    • 0444894411
  • LCCN
    93009334
  • Country Code
    ne
  • Title Language Code
    eng
  • Text Language Code
    eng
  • Place of Publication
    Amsterdam ; Tokyo
  • Pages/Volumes
    viii, 397 p.
  • Size
    25 cm
  • Classification
  • Subject Headings
  • Parent Bibliography ID
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