Optimization
凸优化 豆瓣
Convex Optimization
《信息技术和电气工程学科国际知名教材中译本系列:凸优化》内容非常丰富。理论部分由4章构成,不仅涵盖了凸优化的所有基本概念和主要结果,还详细介绍了几类基本的凸优化问题以及将特殊的优化问题表述为凸优化问题的变换方法,这些内容对灵活运用凸优化知识解决实际问题非常有用。应用部分由3章构成,分别介绍凸优化在解决逼近与拟合、统计估计和几何关系分析这三类实际问题中的应用。算法部分也由3章构成,依次介绍求解无约束凸优化模型、等式约束凸优化模型以及包含不等式约束的凸优化模型的经典数值方法,以及如何利用凸优化理论分析这些方法的收敛性质。通过阅读《信息技术和电气工程学科国际知名教材中译本系列:凸优化》,能够对凸优化理论和方法建立完整的认识。
Approximation Algorithms 豆瓣
作者:
Vijay V. Vazirani
出版社:
Springer
2001
- 7
'This book covers the dominant theoretical approaches to the approximate solution of hard combinatorial optimization and enumeration problems. It contains elegant combinatorial theory, useful and interesting algorithms, and deep results about the intrinsic complexity of combinatorial problems. Its clarity of exposition and excellent selection of exercises will make it accessible and appealing to all those with a taste for mathematics and algorithms' - Richard Karp, University Professor, University of California at Berkeley. Following the development of basic combinatorial optimization techniques in the 1960s and 1970s, a main open question was to develop a theory of approximation algorithms. In the 1990s, parallel developments in techniques for designing approximation algorithms as well as methods for proving hardness of approximation results have led to a beautiful theory. The need to solve truly large instances of computationally hard problems, such as those arising from the Internet or the human genome project, has also increased interest in this theory. The field is currently very active, with the toolbox of approximation algorithm design techniques getting always richer. It is a pleasure to recommend Vijay Vazirani's well-written and comprehensive book on this important and timely topic. "I am sure the reader will find it most useful both as an introduction to approximability as well as a reference to the many aspects of approximation algorithms' - Laszlo Lovasz, Senior Researcher, Microsoft Research.
