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Numerical Modeling of the Global Atmosphere in the Climate System - NATO Science Series C 2000 edition
North Atlantic Treaty Organization
Numerical Modeling of the Global Atmosphere in the Climate System - NATO Science Series C 2000 edition
North Atlantic Treaty Organization
Proceedings of the NATO Advanced Study Institute, on Numerical Modeling of the Global Atmosphere, Castelvecchio Pascoli, Italy, May 25-June 5, 1998
Marc Notes: Proceedings of the NATO Advanced Study Institute on Numerical Modeling of the Global Atmosphere in the Climate System, Castelvecchio Pascoli, Italy, May 25-June 5 1998--T.p. verso.; Published in cooperation with NATO Scientific Affairs Division.; Includes bibliographical references and index. Table of Contents: Preface. Part 1: Preliminary considerations. 1. Weather and Climate GCMs: A memoir; K. Miyakoda. 2. The GCM as a Dynamical System: Implications for numerical simulations; J.-F. Royer. 3. Analysis and Verification of Model Climate; G. J. Boer. 4. Statistical Treatment of Model Output; M. Deque. 5. Use of Simplified Atmospheric Models; J. Thuburn. 6. Designing a GCM Experiment: Fundamentals of the planning process; P. W. Mote. Part 2: Components of an Atmospheric General Circulation Model. 7. Numerical Approximations for global Atmospheric GCMs; D. L. Williamson, R. Laprise. 8. Boundary Layer Processes; N. McFarlane. 9. Moist Convection; N. McFarlane. 10. Clouds and Cloud Water Prediction; J.-J. Morcrette, et al. 11. Radiation; J.-J. Morcrette, S. A. Clough. 12. Gravity-Wave Drag; N. McFarlane. 13. Land Surface Processes and Hydrology; J.-R. Royer. 14. Atmospheric Chemistry and Aerosol Dynamics; J. Feichter. Part 3: Applying GCMs. 15. Atmospheric Data Assimilation; A. O'Neill. 16. Seasonal Predictions; P. W. Mote, et al. 17. Regional Models; M. Deque. 18. Toward a Complete Model of the Climate System; B. A. Boville. 19. Climate Model Intercomparison; G. J. Boer. 20. Paleoclimate Modeling; P. Valdes. 21. Simulating Future Climate; G. J. Boer. Index."Publisher Marketing: 21. Simulating Future Climate G. J. Boer 1 Introduction. . . . . . . . . . . . . . . . 489 2 International Aspects . . . . . . . . . . . 490 3 Simulating Historical and Future Climate 492 4 Climate Change in the 20th Century . . . 495 5 Simulating Future Climate Change 498 6 Climate Impact, Adaptation, and Mitigation 501 7 Summary . 502 Index 505 PREFACE Numerical modeling ofthe global atmosphere has entered a new era. Whereas atmospheric modeling was once the domain ofa few research units at universities or government laboratories, it can now be performed almost anywhere thanks to the affordability of computing power. Atmospheric general circulation models (GCMs) are being used by a rapidly growing scientific community in a wide range of applications. With widespread interest in anthropogenic climate change, GCMs have a role also in informing policy discussions. Many of the scientists using GCMs have backgrounds in fields other than atmospheric sciences and may be unaware of how GCMs are constructed. Recognizing this explosion in the application of GCMs, we organized a two week course in order to give young scientists who are relatively new to the field of atmospheric modeling a thorough grounding in the basic principles on which GCMs are constructed, an insight into their strengths and weaknesses, and guid ance on how meaningful numerical experiments are formulated and analyzed. Sponsored by the North Atlantic Treaty Organization (NATO) and other institu tions, this Advanced Study Institute (ASI) took place May 25-June 5, 1998, at II Ciocco, a remote hotel on a Tuscan hillside in Italy." Review Citations:
Scitech Book News 09/01/2000 pg. 41 (EAN 9780792363019, Hardcover)
Contributor Bio: North Atlantic Treaty Organization Dedication. Preface. Acknowledgments. Clifford Geometric Algebras in Multilinear Algebra and Non-Euclidean Geometries.- Geometric algebra Projective Geometries; Affine and other geometries; Affine Geometry of pseudo-euclidean space; Conformal Geometry and the Horosphere; References. Content-Based Information Retrieval by Group Theoretical Methods.- Introduction; Motivating Examples; General Concept; Fault Tolerance.- Applications, Prototypes, and Test Results; Related Work and Future Research; References.- Four Problems in Radar.-Introduction; Radar Fundamentals; Radar Waveforms; Signal Processing; Space-Time Adaptive Processing; Four Problems in Radar; Conclusions. Introduction to Generalized Classical and Quantum Signal and System Theories on Groups and Hypergroups.-Generalized classical signal/system theory on hypergroups; Generalized quantum signal/system theory on hypergroups; Conclusion; References. Lie Groups and Lie Algebras in Robotics.- Introduction -- Rigid Body Motions; Lie Groups; Finite Screw Motions; Mechanical Joints; Invisible Motion and Gripping; Forward Kinematics; Lie Algebra; The Adjoint Representation; The Exponential Map Derivatives of Exponentials; Jacobians; Concluding Remarks; References. Quantum/Classical Interface: a Geometric Approach from the Classical Side.- Introduction Paravector Space as Spacetime; Eigenspinors; Spin; Dirac Equation; Bell's Theorem; Qubits and Entanglement; Conclusions; References. PONS, Reed-Muller Codes, and Group Algebras.- Introduction; Analytic Theory of One-Dimensional PONS (Welti); Shapiro Sequences, Reed-Muller Codes, and Functional Equations; Group Algebras; Reformulation of Classical PONS; Group Algebra of Classical PONS; GroupAlgebra Convolution; Splitting Sequences; Historical Appendix on PONS; References. Clifford Algebras as a Unified Language.- Introduction; Clifford algebras as models of physical spaces; Clifford Algebras as Models of Perceptual Multicolor Spaces; Hypercomplex-Valued invariants of nD multicolor images; Conclusions; Acknowledgments; References. Recent Progress and Applications in Group FFTs.-Introduction; Finite group FFTs; FFTs for compact groups; Noncompact groups; References. Group Filters and Image Processing.- Introduction: Classical Digital Signal Processing; Abelian Group DSP; Nonabelian Groups; Examples; Group Transforms; Group Filters; Line-like Images; Acknowledgments; References. A Geometric Algebra Approach to Some Problems of Robot Vision.- Introduction; Local Analysis of Multi-dimensional Signals; Knowledge Based Neural Computing; Acknowledgments; References. Group Theory in Radar and Signal Processing.- Introduction; How a Radar Works; Representations; Representations and Radar; Ambiguity Functions; The Wide Band Case; References. Geometry of Paravector Space with Applications to Relativistic Physics.- Clifford Algebras in Physics; Paravector Space as Spacetime; Interpretation; Eigenspinors; Maxwell's Equation; Conclusions; References. A Unified Approach to Fourier-Clifford-Prometheus Transforms- Introduction; New construction of classical and multiparametric Prometheus transforms; PONS associated with Abelian groups; Fast Fourier-Prometheus Transforms; Conclusions; Acknowledgments; References. Fast Color Wavelet Transforms.- Introduction; Color images; Color Wavelet-Haar-Prometheus transforms; Edge detection and compression of color images; Conclusion; Acknowledgments; References. Selected Problems; Various Authors.- Transformations of Euclidean Space and Clifford Geometric; Algebra; References; On the Distribution of Kloosterman Sums on Polynomials over Quaternions; References; Harmonic Sliding Analysis Problems; References; Spectral Analysis under Conditions of Uncertainty; A Canonical Basis for Maximal Tori of the Reductive Centrizer of a Nilpotent Element; References; 6 The Quantum Chaos Conjecture References; Four Problems in Radar; Topic Index; Author Index
Media | Boeken Hardcover Book (Boek met harde rug en kaft) |
Vrijgegeven | 30 april 2000 |
ISBN13 | 9780792363019 |
Uitgevers | Springer |
Pagina's | 517 |
Afmetingen | 170 × 244 × 28 mm · 916 g |
Taal en grammatica | Engels |
Uitgever | Mote, Philip |
Uitgever | O'Neill, A. |
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