| Russell Merris - Mathematics - 2011 - 256 pages
A lively invitation to the flavor, elegance, and power of graph theory This mathematically rigorous introduction is tempered and enlivened by numerous illustrations, revealing ... | |
| Ronald Gould - Mathematics - 2012 - 335 pages
An introductory text in graph theory, this treatment coversprimary techniques and includes both algorithmic and theoreticalproblems. Algorithms are presented with a minimumof ... | |
| Alan Gibbons - Computers - 1985 - 259 pages
An introduction to pure and applied graph theory with an emphasis on algorithms and their complexity. | |
| L.R. Foulds - Mathematics - 2012 - 408 pages
The first part of this text covers the main graph theoretic topics: connectivity, trees, traversability, planarity, colouring, covering, matching, digraphs, networks, matrices ... | |
| Clifford W. Marshall - Mathematics - 1971 - 322 pages
Basic concepts. Basic definitions of linear graphs. Edge sequenses and conectedness. Matrix representation of graphs. special graphs and subgraphs. Connectivity and ... | |
| Gary Chartrand, Ortrud R. Oellermann - Mathematics - 1993 - 395 pages
Designed as a bridge to cross the gap between mathematics and computer science, and planned as the mathematics base for computer science students, this maths text is designed ... | |
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