Time Series with Long Memory by Peter M. Robinson

Time Series with Long Memory

EditorPeter M. Robinson

Paperback | July 10, 2003

not yet rated|write a review

Pricing and Purchase Info

$100.95

Earn 505 plum® points

Ships within 1-3 weeks

Ships free on orders over $25

Not available in stores

about

Long memory processes constitute a broad class of models for stationary and nonstationary time series data in economics, finance, and other fields. Their key feature is persistence, with high correlation between events that are remote in time. A single 'memory' parameter economically indexesthis persistence, as part of a rich parametric or nonparametric structure for the process. Unit root processes can be covered, along with processes that are stationary but with stronger persistence than autoregressive moving averages, these latter being included in a broader class which describesboth short memory and negative memory. Long memory processes have in recent years attracted considerable interest from both theoretical and empirical researchers in time series and econometrics.This book of readings collects articles on a variety of topics in long memory time series including modelling and statistical inference for stationary processes, stochastic volatility models, nonstationary processes, and regression and fractional cointegration models. Some of the articles are highlytheoretical, others contain a mix of theory and methods, and an effort has been made to include empirical applications of the main approaches covered. A review article introduces the other articles but also attempts a broader survey, traces the history of the subject, and includes a bibliography.

About The Author

Peter M. Robinson is Tooke Professor of Economic Science and Statistics, and Leverhulme Research Professor at the London School of Economics. He was previously Professor of Econometrics at the same institution. He has served as Co-Editor of Econometrica and the Journal of Econometrics and Econometric Theory, and as Associate Editor of...
Children Of The Revolution
Children Of The Revolution

by Peter Robinson

$8.00$29.95

In stock online

Available in stores

When The Music's Over
When The Music's Over

by Peter Robinson

$19.17$21.00

In stock online

Available in stores

Sleeping In The Ground
Sleeping In The Ground

by Peter Robinson

$26.65$29.95

Pre-order online

Not yet available in stores

Shop this author

Details & Specs

Title:Time Series with Long MemoryFormat:PaperbackDimensions:392 pages, 9.21 × 6.14 × 0.85 inPublished:July 10, 2003Publisher:Oxford University PressLanguage:English

The following ISBNs are associated with this title:

ISBN - 10:0199257302

ISBN - 13:9780199257300

Look for similar items by category:

Customer Reviews of Time Series with Long Memory

Reviews

Extra Content

Table of Contents

Peter M. Robinson: Introduction1. P. M. Robinson: Long Memory Time Series2. R. K. Adenstedt: On Large-Sample Estimation of the Mean of a Stationary Random Sequence3. C. W. J. Granger and R. Joyeux: Long Memory Relationships and the Aggregation of Dynamic Models4. R. Fox and M. S. Taqqu: Large Sample Properties of Parameter Estimates for Strongly Dependent Stationary Gaussian Time Series5. A. W. Lo: Long-Term Memory in Stock Market Prices6. J. Geweke and S. Porter-Hudak: The Estimation and Application of Long-Memory Time Series Models7. P. M. Robinson: Gaussian Semiparametric Estimation of Long-Range Dependence8. P. M. Robinson: Testing for Strong Serial Correlation and Dynamic Conditional Heteroskedasticity in Multiple Regression9. F. J. Breidt, N. Crato, and P. de Lima: On the Detection and Estimation of Long Memory in Stochastic Volatility10. P. M. Robinson: Efficient Tests of Nonstationary Hypotheses11. C. M. Hurvich and B. K. Ray: Estimation of the Memory Parameter for Nonstationary or Noninvertible Fractionally Integrated Processes12. F. Eicker: Limit Theorems for Regression with Unequal and Dependent Errors13. P. M. Robinson and J. F. Hidalgo: Time Series Regression with Long Range Dependence14. P. M. Robinson and D. Marinucci: Semiparametric Frequency-Domain Analysis of Fractional Cointegration