Book contents
- Frontmatter
- Contents
- Preface
- 1 One-Dimensional Viscoelasticity
- 2 Three-Dimensional Viscoelasticity
- 3 Viscoelastic P, SI, and SII Waves
- 4 Framework for Single-Boundary Reflection–Refraction and Surface-Wave Problems
- 5 General P, SI, and SII Waves Incident on a Viscoelastic Boundary
- 6 Numerical Models for General Waves Reflected and Refracted at Viscoelastic Boundaries
- 7 General SI, P, and SII Waves Incident on a Viscoelastic Free Surface
- 8 Rayleigh-Type Surface Wave on a Viscoelastic Half Space
- 9 General SII Waves Incident on Multiple Layers of Viscoelastic Media
- 10 Love-Type Surface Waves in Multilayered Viscoelastic Media
- 11 Appendices
- References
- Additional Reading
- Index
Preface
Published online by Cambridge University Press: 29 October 2009
- Frontmatter
- Contents
- Preface
- 1 One-Dimensional Viscoelasticity
- 2 Three-Dimensional Viscoelasticity
- 3 Viscoelastic P, SI, and SII Waves
- 4 Framework for Single-Boundary Reflection–Refraction and Surface-Wave Problems
- 5 General P, SI, and SII Waves Incident on a Viscoelastic Boundary
- 6 Numerical Models for General Waves Reflected and Refracted at Viscoelastic Boundaries
- 7 General SI, P, and SII Waves Incident on a Viscoelastic Free Surface
- 8 Rayleigh-Type Surface Wave on a Viscoelastic Half Space
- 9 General SII Waves Incident on Multiple Layers of Viscoelastic Media
- 10 Love-Type Surface Waves in Multilayered Viscoelastic Media
- 11 Appendices
- References
- Additional Reading
- Index
Summary
This book provides a self-contained mathematical exposition of the theory of monochromatic wave propagation in layered viscoelastic media. It provides analytic solutions and numerical results for fundamental wave-propagation problems in arbitrary linear viscoelastic media not published previously in a book. As a text book with numerical examples and problem sets, it provides the opportunity to teach the theory of monochromatic wave propagation as usually taught for elastic media in the broader context of wave propagation in any media with a linear response without undue complications in the mathematics. Formulations of the expressions for the waves and the constitutive relation for the media afford considerable generality and simplification in the mathematics required to derive analytic solutions valid for any viscoelastic solid including an elastic medium. The book is intended for the beginning student of wave propagation with prerequisites being knowledge of differential equations and complex variables.
As a reference text, this book provides the theory of monochromatic wave propagation in more than one dimension developed in the last three to four decades. As such, it provides a compendium of recent advances that show that physical characteristics of two- and three-dimensional anelastic body and surface waves are not predictable from the theory for one-dimensional waves. It provides the basis for the derivation of results beyond the scope of the present text book. The theory is of interest in the broad field of solid mechanics and of special interest in seismology, engineering, exploration geophysics, and acoustics for consideration of wave propagation in layered media with arbitrary amounts of intrinsic absorption, ranging from low-loss models of the deep Earth to moderate-loss models for soils and weathered rock.
- Type
- Chapter
- Information
- Viscoelastic Waves in Layered Media , pp. xi - xviPublisher: Cambridge University PressPrint publication year: 2009