Synopses & Reviews
Space, structure, and randomness: these are the three key concepts underlying Georges Matheron's scientific work. He first encountered them at the beginning of his career when working as a mining engineer, and then they resurfaced in fields ranging from meteorology to microscopy. What could these radically different types of applications possibly have in common? First, in each one only a single realisation of the phenomenon is available for study, but its features repeat themselves in space; second, the sampling pattern is rarely regular, and finally there are problems of change of scale. This volume is divided in three sections on random sets, geostatistics and mathematical morphology. They reflect his professional interests and his search for underlying unity. Some readers may be surprised to find theoretical chapters mixed with applied ones. We have done this deliberately. GM always considered that the distinction between the theory and practice was purely academic. When GM tackled practical problems, he used his skill as a physicist to extract the salient features and to select variables which could be measured meaningfully and whose values could be estimated from the available data. Then he used his outstanding ability as a mathematician to solve the problems neatly and efficiently. It was his capacity to combine a physicist's intuition with a mathematician's analytical skills that allowed him to produce new and innovative solutions to difficult problems. The book should appeal to graduate students and researchers working in mathematics, probability, statistics, physics, spatial data analysis, and image analysis. In addition it will be of interest to those who enjoy discovering links between scientific disciplines that seem unrelated at first glance. In writing the book the contributors have tried to put GM's ideas into perspective. During his working life, GM was a genuinely creative scientist. He developed innovative concepts whose usefulness goes far beyond the confines of the discipline for which they were originally designed. This is why his work remains as pertinent today as it was when it was first written.
Synopsis
Georges Matheron passed away on 7 August 2000. He did pioneering work in many branches of applied mathematics, being at the origin of geostatistics and mathematical morphology; he made also fundamental contributions to the theory of random models. Scientists have been invited to write chapters on specific topics. In order to obtain a well-balanced volume, the topics to be included in each chapter will be agreed upon beforehand. Contributions should highlight Georges Matheron's approach to solving problems, or illustrate the dynamic way that theories or methods that were initially developed by him have continued to be productive. In some cases it would also be interesting to show how the specific characteristics of certain domains of application led to the emergence of new theories or methods. The proposed volume will be split into three main sections of approximately equal importance: random sets, geostatistics and mathematical morphology
Synopsis
This edited volume is split into three main sections of approximately equal importance: random sets, geostatistics and mathematical morphology.
Synopsis
Space, structure, and randomness: these are the three key concepts underlying Georges Matherons scientific work. He first encountered them at the beginning of his career when working as a mining engineer, and then they resurfaced in fields ranging from meteorology to microscopy. What could these radically different types of applications possibly have in common? First, in each one only a single realisation of the phenomenon is available for study, but its features repeat themselves in space; second, the sampling pattern is rarely regular, and finally there are problems of change of scale.
This volume is divided in three sections on random sets, geostatistics and mathematical morphology. They reflect his professional interests and his search for underlying unity. Some readers may be surprised to find theoretical chapters mixed with applied ones. We have done this deliberately. GM always considered that the distinction between the theory and practice was purely academic.
When GM tackled practical problems, he used his skill as a physicist to extract the salient features and to select variables which could be measured meaningfully and whose values could be estimated from the available data. Then he used his outstanding ability as a mathematician to solve the problems neatly and efficiently. It was his capacity to combine a physicists intuition with a mathematicians analytical skills that allowed him to produce new and innovative solutions to difficult problems.
The book should appeal to graduate students and researchers working in mathematics, probability, statistics, physics, spatial data analysis, and image analysis. In addition it will be of interest to those who enjoydiscovering links between scientific disciplines that seem unrelated at first glance. In writing the book the contributors have tried to put GMs ideas into perspective. During his working life, GM was a genuinely creative scientist. He developed innovative concepts whose usefulness goes far beyond the confines of the discipline for which they were originally designed. This is why his work remains as pertinent today as it was when it was first written.
Table of Contents
Personal reminiscences of Georges Matheron, Dietrich Stoyan.- A few words about Georges Matheron (1930-2000), Jean Serra.- Introduction.- The genesis of geostatistics in gold and diamond industries, Danie Krige, Wynand Kleingeld.- Concepts and methods of geostatistics, Jacques Rivoirard.- Prediction by conditional simulation: models and algorithms, Jean-Paul Chilés, Christian Lantuéjoul.- Flow in porous media: an attempt to outline Georges Matheron's contributions, J.P. Delhomme, G. de Marsily.- Over thirty years of petroleum geostatistics, Pierre Delfiner, André Haas.- The expansion of environmental geostatistics, Roberto Bruno, Chantal de Fouquet.- Random closed sets, I. Molchanov.- The Boolean model: from Matheron till Today, Dietrich Stoyan, Klaus Mecke.- Random structures in physics, Dominique Jeulin.- Mophological operatorors for the segmentation of colour images, Jean Serra.- Automatic design of morphological operators, Junior Barrera, Gerald J.F. Banon, Edward R. Dougherty.- Morphological decomposition systems with perfect reconstruction: from pyramids to wavelets, Henk J.A.M. Heijmans, John Goutsias.- Morphological segmentation revisited, Fernand Meyer.- Ubiquity of the distance function in mathematical morphology, Michel Schmitt.- Partial differential equations for morphological operators, Frederic Guichard, Petros Maragos, Jean-Michel Morel.