Titre : | Random vibration and statistical linearization | Type de document : | document imprimé | Auteurs : | J. B. Roberts, Auteur ; P. D. Spanos, Auteur | Editeur : | Dover Publications | Année de publication : | 1990 | Importance : | XIII-407 p. : ill. ; 24 cm | ISBN/ISSN/EAN : | 0-486-43240-8 | Note générale : | Paperback
| Langues : | Français (fre) | Résumé : | Coherent and self-contained, this volume explains the general method of statistical, or equivalent, linearization and its use in solving random vibration problems. Numerous examples offer advanced undergraduate and graduate engineering students a comprehensive view of the method's practical applications. Subjects include general equations of motion and the representation of non-linearities, probability theory and stochastic processes, elements of linear random vibration theory, statistical linearization for simple systems with stationary response, statistical linearization of multi-degree of freedom systems with stationary response, and non-stationary problems. 122 figures. 16 tables. Table of Contents for Random Vibration and Statistical Linearization Preface 1. Introduction 2. General Equations of Motion and the Representation of Non-linearities 3. Probability Theory and Stochastic Processes 4. Elements of Linear Random Vibration Theory 5. Statistical Linearization for Simple Systems with Stationary Response 6. Statistical Linearization of Multi-Degree of Freedom Systems with Stationary Response 7. Non-stationary Problems 8. Systems with Hysteretic Non-linearity 9. Relaxation of the Gaussian Response Assumption 10. Accuracy of Statistical Linearization Appendixes. References. Author Index. Subject Index
| Note de contenu : | Appartient à Emmanuel Villermaux
|
Random vibration and statistical linearization [document imprimé] / J. B. Roberts, Auteur ; P. D. Spanos, Auteur . - [S.l.] : Dover Publications, 1990 . - XIII-407 p. : ill. ; 24 cm. ISBN : 0-486-43240-8 Paperback
Langues : Français ( fre) Résumé : | Coherent and self-contained, this volume explains the general method of statistical, or equivalent, linearization and its use in solving random vibration problems. Numerous examples offer advanced undergraduate and graduate engineering students a comprehensive view of the method's practical applications. Subjects include general equations of motion and the representation of non-linearities, probability theory and stochastic processes, elements of linear random vibration theory, statistical linearization for simple systems with stationary response, statistical linearization of multi-degree of freedom systems with stationary response, and non-stationary problems. 122 figures. 16 tables. Table of Contents for Random Vibration and Statistical Linearization Preface 1. Introduction 2. General Equations of Motion and the Representation of Non-linearities 3. Probability Theory and Stochastic Processes 4. Elements of Linear Random Vibration Theory 5. Statistical Linearization for Simple Systems with Stationary Response 6. Statistical Linearization of Multi-Degree of Freedom Systems with Stationary Response 7. Non-stationary Problems 8. Systems with Hysteretic Non-linearity 9. Relaxation of the Gaussian Response Assumption 10. Accuracy of Statistical Linearization Appendixes. References. Author Index. Subject Index
| Note de contenu : | Appartient à Emmanuel Villermaux
|
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