This book offers a relatively large overview of modeling families which exist in spatial analysis and of the different mindsets that went into them. Models presented are related to space organization principles, localization logic, the form of spati
This second edition of G. Winkler's successful book on random field approaches to image analysis, related Markov Chain Monte Carlo methods, and statistical inference with emphasis on Bayesian image analysis concentrates more on general principles an
This book introduces the mathematics that supports advanced computer Programming and the analysis of algorithms. The primary aim of its well-known authors is to provide a solid and relevant base of mathematical skills--the skills needed to solve com
Geometry is the mathematical discipline that deals with the interrelations of objects in the plane, in space, or even in higher dimensions. Practicing geometry comes in very different flavors. More than any other mathematical discipline, the field o
For physics students interested in the mathematics they use, and for math students interested in seeing how some of the ideas of their discipline find realization in an applied setting. The presentation strikes a balance between formalism and applic
This book introduces the mathematics that supports advanced computer Programming and the analysis of algorithms. The primary aim of its well-known authors is to provide a solid and relevant base of mathematical skills--the skills needed to solve c
揭秘系列,离散数学 In today’s world, analytical thinking is a critical part of any solid education. An important segment of this kind of reasoning—one that cuts across many disciplines—is discrete mathematics. Discrete math concerns counting, probability, (s
This book presents statistical methods and models of importance to quantitative finance and links finance theory to market practice via statistical modeling and decision making Part I provides basic background in statistics which includes linear reg
Aims and scope: The feld of fnancial mathematics forms an ever-expanding slice of the fnancial sector. This series aims to capture new developments and summarize what is known over the whole spectrum of this feld. It will include a broad range of te
算法分析中经常遇到需要求解递推式的情况,即将递推式改写为等价的封闭形式。例如汉诺塔问题的时间复杂度递推 形式为 T (n)=2T (n−1)+1 (n≥1) ,可以解出封闭形式为 T (n)=2 n −1 (设初始状态 T (0)=0 )。 因为递推式求解的重要性,许多算法书籍对其有专门介绍。Donald Knuth在Concrete Mathematics一书中多个章节都 涉及递推式求解方法。算法导论也在第四章中专门论述的这个主题。 在这些相关论述中,主要介绍了一些启发式方法,这些方法往往需要
