Physical description 
1 online resource (xii, 286 pages). 
Series 
Springer Series in Statistics, 01727397


Springer series in statistics.

Contents 
Physical Experiments and Computer Experiments  Basic Elements of Computer Experiments  Analyzing Output from Computer ExperimentsPredicting Output from Training Data  Space Filling Designs for Computer Experiments  Criteria Based Designs for Computer Experiments  Other Issues. 
Summary 
The computer has become an increasingly popular tool for exploring the relationship between a measured response and factors thought to affect the response. In many cases, the basis of a computer model is a mathematical theory that implicitly relates the response to the factors. A computer model becomes possible given suitable numerical methods for accurately solving the mathematical system and appropriate computer hardware and software to implement the numerical methods. For example, in many engineering applications, the relationship is described by a dynamical system and the numerical method is a finite element code. The resulting computer "simulator" can generate the response corresponding to any given set of values of the factors. This allows one to use the code to conduct a "computer experiment" to explore the relationship between the response and the factors. In some cases, computer experimentation is feasible when a properly designed physical experiment (the gold standard for establishing cause and effect) is impossible; the number of input variables may be too large to consider performing a physical experiment, or power studies may show it is economically prohibitive to run an experiment on the scale required to answer a given research question. This book describes methods for designing and analyzing experiments that are conducted using a computer code rather than a physical experiment. It discusses how to select the values of the factors at which to run the code (the design of the computer experiment) in light of the research objectives of the experimenter. It also provides techniques for analyzing the resulting data so as to achieve these research goals. It illustrates these methods with code that is available to the reader at the companion web site for the book. Thomas Santner has been a professor in the Department of Statistics at The Ohio State University since 1990. At Ohio State, he has served as department Chair and Director of the department's Statistical Consulting Service. Previously, he was a professor in the School of Operations Research and Industrial Engineering at Cornell University. He is a Fellow of the American Statistical Association and the Institute of Mathematical Statistics, and is an elected ordinary member of the International Statistical Institute. He visited Ludwig Maximilians Universitt in Munich, Germany on a Fulbright Scholarship in 199697. Brian Williams has been an Associate Statistician at the RAND Corporation since 2000. His research interests include experimental design, computer experiments, Bayesian inference, spatial statistics and statistical computing. He holds a Ph. D. in statistics from The Ohio State University. William Notz is a professor in the Department of Statistics at The Ohio State University. At Ohio State, he has served as acting department chair, associate dean of the College of Mathematical and Physical Sciences, and as director of the department's Statistical Consulting Service. He has also served as Editor of the journal Technometrics and is a Fellow of the American Statistical Association. 
Other author 
Williams, Brian J.


Notz, William I.

Subject 
Statistics.


Mathematical statistics.


Engineering mathematics.


Electronic books. 
ISBN 
9781475737998 (electronic bk.) 

1475737998 (electronic bk.) 

9781441929921 

1441929924 

1475737998 
