Directions in Infinite Graph Theory and Combinatorics: Volume 3
With an introduction by C.St.J.A. Nash-Williams
Published on 25. March 1992
Book
Hardback
392 pages
978-0-444-89414-4 (ISBN)
Description
This book has arisen from a colloquium held at St. John's College, Cambridge, in July 1989, which brought together most of today's leading experts in the field of infinite graph theory and combinatorics. This was the first such meeting ever held, and its aim was to assess the state of the art in the
discipline, to consider its links with other parts of mathematics, and to discuss possible directions for future development. This volume reflects the Cambridge meeting in both level and scope. It contains research papers as well as expository surveys of particular areas. Together they offer a comprehensive portrait of infinite graph theory and combinatorics, which should be particularly attractive to anyone new to the discipline.
This book has arisen from a colloquium held at St. John's College, Cambridge, in July 1989, which brought together most of today's leading experts in the field of infinite graph theory and combinatorics. This was the first such meeting ever held, and its aim was to assess the state of the art in the
discipline, to consider its links with other parts of mathematics, and to discuss possible directions for future development. This volume reflects the Cambridge meeting in both level and scope. It contains research papers as well as expository surveys of particular areas. Together they offer a comprehensive portrait of infinite graph theory and combinatorics, which should be particularly attractive to anyone new to the discipline.
discipline, to consider its links with other parts of mathematics, and to discuss possible directions for future development. This volume reflects the Cambridge meeting in both level and scope. It contains research papers as well as expository surveys of particular areas. Together they offer a comprehensive portrait of infinite graph theory and combinatorics, which should be particularly attractive to anyone new to the discipline.
This book has arisen from a colloquium held at St. John's College, Cambridge, in July 1989, which brought together most of today's leading experts in the field of infinite graph theory and combinatorics. This was the first such meeting ever held, and its aim was to assess the state of the art in the
discipline, to consider its links with other parts of mathematics, and to discuss possible directions for future development. This volume reflects the Cambridge meeting in both level and scope. It contains research papers as well as expository surveys of particular areas. Together they offer a comprehensive portrait of infinite graph theory and combinatorics, which should be particularly attractive to anyone new to the discipline.
More details
Series
Language
English
Place of publication
United States
Publishing group
Elsevier Science & Technology
Target group
College/higher education
Professional and scholarly
ISBN-13
978-0-444-89414-4 (9780444894144)
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Additional editions
R. Diestel
Directions in Infinite Graph Theory and Combinatorics
With an introduction by C.St.J.A. Nash-Williams
E-Book
06/2016
Elsevier
€51.95
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Content
Infinite Matching Theory (R. Aharoni). Gallai-Milgram Properties for
Infinite Graphs (J.-M. Brochet, M. Pouzet). The Age of a Relational
Structure (P.J. Cameron). Decomposing Infinite Graphs (R. Diestel). Bounded
Graphs (R. Halin). A Survey on Graphs with Polynomial Growth (W. Imrich, N.
Seifter). Some Results on Ends and Automorphisms of Graphs (H.A. Jung).
Analyzing Nash-Williams' Partition Theorem by Means of Ordinal Types (I.
Křiž, R. Thomas). Matchings from a Set Below to a Set
Above (P. Erdős, J.A. Larson). A Partition Relation for Triples Using
a Model of Todorčević (E.C. Milner, K. Prikry). Some
Relations Between Analytic and Geometric Properties of Infinite Graphs (B.
Mohar). Reconstruction of Infinite Graphs (C.St.J.A. Nash-Williams).
f-Optimal Factors of Infinite Graphs (F. Niedermeyer). Universal
Elements and the Complexity of Certain Classes of Infinite Graphs (P.
Komjath, J. Pach). Asymmetrising Sets in Trees (N. Polat, G.
Sabidussi). Asymmetrization of Infinite Trees (N. Polat). Excluding
Infinite Minors (N. Robertson, P. Seymour, R. Thomas). An End-Faithful
Spanning Tree Counterexample (P. Seymour, R. Thomas). End-faithful Forests
and Spanning Trees in Infinite Graphs (J. Siraň). Fast
Growing Functions Based on Ramsey Theorems (H.J. Proemel, W. Thumser,
B. Voigt). Edge-transitive Strips (M.E. Watkins). Topological Groups and
Infinite Graphs (W. Woess).
Infinite Graphs (J.-M. Brochet, M. Pouzet). The Age of a Relational
Structure (P.J. Cameron). Decomposing Infinite Graphs (R. Diestel). Bounded
Graphs (R. Halin). A Survey on Graphs with Polynomial Growth (W. Imrich, N.
Seifter). Some Results on Ends and Automorphisms of Graphs (H.A. Jung).
Analyzing Nash-Williams' Partition Theorem by Means of Ordinal Types (I.
Křiž, R. Thomas). Matchings from a Set Below to a Set
Above (P. Erdős, J.A. Larson). A Partition Relation for Triples Using
a Model of Todorčević (E.C. Milner, K. Prikry). Some
Relations Between Analytic and Geometric Properties of Infinite Graphs (B.
Mohar). Reconstruction of Infinite Graphs (C.St.J.A. Nash-Williams).
f-Optimal Factors of Infinite Graphs (F. Niedermeyer). Universal
Elements and the Complexity of Certain Classes of Infinite Graphs (P.
Komjath, J. Pach). Asymmetrising Sets in Trees (N. Polat, G.
Sabidussi). Asymmetrization of Infinite Trees (N. Polat). Excluding
Infinite Minors (N. Robertson, P. Seymour, R. Thomas). An End-Faithful
Spanning Tree Counterexample (P. Seymour, R. Thomas). End-faithful Forests
and Spanning Trees in Infinite Graphs (J. Siraň). Fast
Growing Functions Based on Ramsey Theorems (H.J. Proemel, W. Thumser,
B. Voigt). Edge-transitive Strips (M.E. Watkins). Topological Groups and
Infinite Graphs (W. Woess).