This book focuses on three disciplines of applied mathematics: control theory, location science and computational geometry. The authors show how methods and tools from convex geometry in a wider sense can help solve various problems from these disciplines. More precisely they consider mainly the tent method (as an application of a generalized separation theory of convex cones) in nonclassical variational calculus, various median problems in Euclidean and other Minkowski spaces (including a detailed discussion of the Fermat-Torricelli problem) and different types of partitionings of topologically complicated polygonal domains into a minimum number of convex pieces. Figures are used extensively throughout the book and there is also a large collection of exercises.
Audience: Graduate students, teachers and researchers.
Geometric Methods and Optimization Problems (Combinatorial Optimization)
📄 Viewing lite version
Full site ›
⌛ 🇫🇷 France pricing being fetched…
Prices will appear once fetched — usually within a few minutes.
View in:
🇺🇸 USA