Cheltenham, UK ; Northampton, MA : E. Elgar, ©2002

1843760274

VIII, 284 p. ; 25 cm

Düvell, Franck

325

FSPBC

VI F 292

Inglese

Grenoble : Presses Universitaires de Grenoble, 1973

581 p. ; 24 cm

Collection Theta

841.1

FLFBC

841.1 DUB 1

Francese

Cham : , : Springer International Publishing : , : Imprint : Springer, , 2018

9783319769387

3319769383

1 online resource (XX, 308 p. 29 illus., 10 illus. in color.)

Mathématiques et Applications, , 2198-3275 ; ; 80

519.55

Statistics

Probabilities

Econometrics

Dynamics

Statistical Theory and Methods

Probability Theory

Dynamical Systems

Inglese

Includes bibliographical references and index.

Part I Independence and Stationarity -- 1 Probability and Independence -- 2 Gaussian convergence and inequalities -- 3 Estimation concepts -- 4 Stationarity -- Part II Models of time series -- 5 Gaussian chaos -- 6 Linear processes -- 7 Non-linear processes -- 8 Associated processes -- Part III Dependence -- 9 Dependence -- 10 Long-range dependence -- 11 Short-range dependence -- 12 Moments and cumulants -- Appendices -- A Probability and distributions -- B Convergence and processes -- C R scripts used for the gures -- Index- List of figures.

This book presents essential tools for modelling non-linear time series. The first part of the book describes the main standard tools of probability and statistics that directly apply to the time series context to obtain a wide range of modelling possibilities. Functional estimation and bootstrap are discussed, and stationarity is reviewed. The second part describes a number of tools from Gaussian chaos and proposes a tour of linear time series models. It goes on to address nonlinearity from polynomial or chaotic models for which explicit expansions are available, then turns to Markov and non-Markov linear models and discusses Bernoulli shifts time series models. Finally, the volume focuses on the limit theory, starting with the ergodic theorem, which is seen as the first step for statistics of time series. It defines the distributional range to obtain generic tools for limit theory under long or short-range dependences (LRD/SRD) and explains examples of LRD behaviours. More general techniques (central limit theorems) are described under SRD; mixing and weak dependence are also reviewed. In closing, it describes moment techniques together with their relations to cumulant sums as well as an application to kernel type estimation.The appendix reviews basic probability theory facts and discusses useful laws stemming from the Gaussian laws as well as the basic principles of probability, and is completed by R-scripts used for the figures. Richly illustrated with examples and simulations, the book is recommended for advanced master courses for mathematicians just entering the field of time series, and statisticians who want more mathematical insights into the background of non-linear time series. .