| Graph Theory Applications Contributor(s): Foulds, L. R. (Author) |
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ISBN: 0387975993 ISBN-13: 9780387975993 Publisher: Springer OUR PRICE: $61.74 Product Type: Paperback Published: November 1991 Annotation: This text offers an introduction to the theory of graphs and its application in engineering and science. The first part covers the main graph theoretic topics: connectivity, trees, traversability, planarity, coloring, covering, matching, digraphs, networks, matrices of a graph, graph theoretic algorithms, and matroids. In the second part, these concepts are applied to problems in engineering, operations reserach, and science as well as to an interesting set of miscellaneous problems, thus iluustrating their broad applicability. Some effort has been made to present applications that use not merely the notation and terminology of graph theory, but its actual mathematical results. Some of the applications, such as in molecular evolution, facilities layout, and graffic network design, have never appeared before in book form. Written at an advanced undergraduate to beginning graduate level, the book is suitable for students of mathematics, engineering, operations resrach, computer science, and physical sciences as well as for researchers and practitioners with an interest in graph theoretic modelling. |
| Additional Information |
| BISAC Categories: - Mathematics | Graphic Methods - Computers | Computer Graphics - Mathematics | Discrete Mathematics |
| Dewey: 511.5 |
| LCCN: 95159476 |
| Series: Universitext |
| Physical Information: 0.84" H x 6.14" W x 9.21" (1.25 lbs) 408 pages |
| Descriptions, Reviews, Etc. |
| Publisher Description: Over the last 30 years graph theory has evolved into an important math- ematical tool in the solution of a wide variety of problems in many areas of society. The purpose of this book is to present selected topics from this theory that have been found useful and to point out various applications. Some important theoretical topics have been omitted as they are not es- sential for the applications in Part II. Hence Part I should not be seen as a well-rounded treatise on the theory of graphs. Some effort has been made to present new applications that do not use merely the notation and ter- minology of graphs but do actually implement some mathematical results from graph theory. It has been written for final undergraduate year or first year graduate students in engineering, mathematics, computer science, and operations research, as well as researchers and practitioners with an inter- est in graph theoretic modelling. Suggested plans for the reading of the book by people with these interests are given later. The book comprises two parts. The first is a brief introduction to the mathematical theory of graphs. The second is a discussion on the applications of this material to some areas in the subjects previously mentioned. It is, of course, possi- ble to read only the first part to attempt to gain an appreciation of the mathematical aspects of graph theory. However even the purest of mathe- maticians is strongly recommended to delve seriously into the second part. |
