Quo vadis, graph theory? [E-Book] : a source book for challenges and directions / edited by John Gimbel, John W. Kennedy, and Louis V. Quintas.
Graph Theory (as a recognized discipline) is a relative newcomer to Mathematics. The first formal paper is found in the work of Leonhard Euler in 1736. In recent years the subject has grown so rapidly that in today's literature, graph theory papers abound with new mathematical developments and...
Saved in:
Full text |
|
Personal Name(s): | Gimbel, John Gordon. |
Kennedy, J. W. / Quintas, Louis V. | |
Imprint: |
Amsterdam ; New York :
North-Holland,
1993
|
Physical Description: |
1 online resource (viii, 397 p.) : ill. |
Note: |
englisch |
ISBN: |
0444894411 9780444894410 |
Series Title: |
/* Depending on the record driver, $field may either be an array with
"name" and "number" keys or a flat string containing only the series
name. We should account for both cases to maximize compatibility. */?>
Annals of discrete mathematics ;
55 |
Subject (LOC): |
Graph Theory (as a recognized discipline) is a relative newcomer to Mathematics. The first formal paper is found in the work of Leonhard Euler in 1736. In recent years the subject has grown so rapidly that in today's literature, graph theory papers abound with new 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 have together provided a comprehensive reference source for future directions and open questions in the field. |