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Elastic wave propagation in transversely isotropic media [electronic resource] /
In this monograph I record those parts of the theory of transverse isotropic elastic wave propagation which lend themselves to an exact treatment, within the framework of linear theory. Emphasis is placed on transient wave motion problems in two- and three-dimensional unbounded and semibounded solids for which explicit results can be obtained, without resort to approximate methods of integration. The mathematical techniques used, many of which appear here in book form for the first time, will be of interest to applied mathematicians, engeneers and scientists whose specialty includes crystal acoustics, crystal optics, magnetogasdynamics, dislocation theory, seismology and fibre wound composites. My interest in the subject of anisotropic wave motion had its origin in the study of small deformations superposed on large deformations of elastic solids. By varying the initial stretch in a homogeneously deformed solid, it is possible to synthesize aniso tropic materials whose elastic parameters vary continuously. The range of the parameter variation is limited by stability considerations in the case of small deformations super posed on large deformation problems and (what is essentially the same thing) by the of hyperbolicity (solids whose parameters allow wave motion) for anisotropic notion solids. The full implication of hyperbolicity for anisotropic elastic solids has never been previously examined, and even now the constraints which it imposes on the elasticity constants have only been examined for the class of transversely isotropic (hexagonal crystals) materials.
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| Format: | Texto biblioteca |
| Language: | eng |
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Dordrecht : Springer Netherlands,
1983
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| Subjects: | Physics., Mechanics., Applied mathematics., Engineering mathematics., Vibration., Dynamical systems., Dynamics., Vibration, Dynamical Systems, Control., Appl.Mathematics/Computational Methods of Engineering., |
| Online Access: | http://dx.doi.org/10.1007/978-94-009-6866-0 |
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Physics. Mechanics. Applied mathematics. Engineering mathematics. Vibration. Dynamical systems. Dynamics. Physics. Mechanics. Vibration, Dynamical Systems, Control. Appl.Mathematics/Computational Methods of Engineering. Physics. Mechanics. Applied mathematics. Engineering mathematics. Vibration. Dynamical systems. Dynamics. Physics. Mechanics. Vibration, Dynamical Systems, Control. Appl.Mathematics/Computational Methods of Engineering. |
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Physics. Mechanics. Applied mathematics. Engineering mathematics. Vibration. Dynamical systems. Dynamics. Physics. Mechanics. Vibration, Dynamical Systems, Control. Appl.Mathematics/Computational Methods of Engineering. Physics. Mechanics. Applied mathematics. Engineering mathematics. Vibration. Dynamical systems. Dynamics. Physics. Mechanics. Vibration, Dynamical Systems, Control. Appl.Mathematics/Computational Methods of Engineering. Payton, Robert G. author. SpringerLink (Online service) Elastic wave propagation in transversely isotropic media [electronic resource] / |
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In this monograph I record those parts of the theory of transverse isotropic elastic wave propagation which lend themselves to an exact treatment, within the framework of linear theory. Emphasis is placed on transient wave motion problems in two- and three-dimensional unbounded and semibounded solids for which explicit results can be obtained, without resort to approximate methods of integration. The mathematical techniques used, many of which appear here in book form for the first time, will be of interest to applied mathematicians, engeneers and scientists whose specialty includes crystal acoustics, crystal optics, magnetogasdynamics, dislocation theory, seismology and fibre wound composites. My interest in the subject of anisotropic wave motion had its origin in the study of small deformations superposed on large deformations of elastic solids. By varying the initial stretch in a homogeneously deformed solid, it is possible to synthesize aniso tropic materials whose elastic parameters vary continuously. The range of the parameter variation is limited by stability considerations in the case of small deformations super posed on large deformation problems and (what is essentially the same thing) by the of hyperbolicity (solids whose parameters allow wave motion) for anisotropic notion solids. The full implication of hyperbolicity for anisotropic elastic solids has never been previously examined, and even now the constraints which it imposes on the elasticity constants have only been examined for the class of transversely isotropic (hexagonal crystals) materials. |
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Texto |
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Physics. Mechanics. Applied mathematics. Engineering mathematics. Vibration. Dynamical systems. Dynamics. Physics. Mechanics. Vibration, Dynamical Systems, Control. Appl.Mathematics/Computational Methods of Engineering. |
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Payton, Robert G. author. SpringerLink (Online service) |
| author_facet |
Payton, Robert G. author. SpringerLink (Online service) |
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Payton, Robert G. author. |
| title |
Elastic wave propagation in transversely isotropic media [electronic resource] / |
| title_short |
Elastic wave propagation in transversely isotropic media [electronic resource] / |
| title_full |
Elastic wave propagation in transversely isotropic media [electronic resource] / |
| title_fullStr |
Elastic wave propagation in transversely isotropic media [electronic resource] / |
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Elastic wave propagation in transversely isotropic media [electronic resource] / |
| title_sort |
elastic wave propagation in transversely isotropic media [electronic resource] / |
| publisher |
Dordrecht : Springer Netherlands, |
| publishDate |
1983 |
| url |
http://dx.doi.org/10.1007/978-94-009-6866-0 |
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AT paytonrobertgauthor elasticwavepropagationintransverselyisotropicmediaelectronicresource AT springerlinkonlineservice elasticwavepropagationintransverselyisotropicmediaelectronicresource |
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1756265157783191552 |
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KOHA-OAI-TEST:1838772018-07-30T23:05:16ZElastic wave propagation in transversely isotropic media [electronic resource] / Payton, Robert G. author. SpringerLink (Online service) textDordrecht : Springer Netherlands,1983.engIn this monograph I record those parts of the theory of transverse isotropic elastic wave propagation which lend themselves to an exact treatment, within the framework of linear theory. Emphasis is placed on transient wave motion problems in two- and three-dimensional unbounded and semibounded solids for which explicit results can be obtained, without resort to approximate methods of integration. The mathematical techniques used, many of which appear here in book form for the first time, will be of interest to applied mathematicians, engeneers and scientists whose specialty includes crystal acoustics, crystal optics, magnetogasdynamics, dislocation theory, seismology and fibre wound composites. My interest in the subject of anisotropic wave motion had its origin in the study of small deformations superposed on large deformations of elastic solids. By varying the initial stretch in a homogeneously deformed solid, it is possible to synthesize aniso tropic materials whose elastic parameters vary continuously. The range of the parameter variation is limited by stability considerations in the case of small deformations super posed on large deformation problems and (what is essentially the same thing) by the of hyperbolicity (solids whose parameters allow wave motion) for anisotropic notion solids. The full implication of hyperbolicity for anisotropic elastic solids has never been previously examined, and even now the constraints which it imposes on the elasticity constants have only been examined for the class of transversely isotropic (hexagonal crystals) materials.1. Basic equations -- 1. The Linearized Equations of Motion of an Anisotropic Elastic Solid -- 2. The Effect on the Equations of Motion of a Coordinate Rotation -- 3. The Elasticities for a Transversely Isotropic Solid -- 4. The Constraints on the c??’s of Positive Definiteness -- 5. The Constraints on the c??’s of Strong Ellipticity -- 6. The Uncoupled Equations of Motion in Two-Dimensions -- 7. The Uncoupled Equations of Motion in Three-Dimensions -- 8. Some Other Transversely Isotropic Continuum Theories -- 2. Wave front shape caused by a point source in unbounded media -- I Two Space Dimensions -- II Three Space Dimensions -- 3. Green’s tensor for the displacement field in unbounded media -- I Two Space Dimensions -- II Three Space Dimensions -- 4. Surface motion of a two-dimensional half-space (Lamb’s problem) -- 1. Formulation of the Problem -- 2. Integral Transform Representation of the Solution When the Fourier Inversion Path is Free of Branch Points -- 3. Transform Inversion for Materials Satisfying Condition (1) of Table 11 -- 4. Transform Inversion for Materials Satisfying Condition (2) of Table 11 -- 5. Transform Inversion for Materials Satisfying Condition (3) of Table 11 -- 6. Graph of the Surface Displacements for Some Hexagonal Crystals -- 5. Epicenter and epicentral-axis motion of a three-dimensional half-space -- 1. Problem Formulation for the Epicenter Motion of a Half-Space Due to the Sudden Application of a Buried Point Source -- 2. Transform Inversion at the Epicenter for Materials Satisfying Condition (1) of Table 11 -- 3. Discussion of the ?-Plane Branch Points and the Cagniard Path When the Real ?-Axis is Not Free of Branch Points -- 4. Transform Inversion at the Epicenter for Materials Satisfying Conditions (2) and (3) of Table 11 -- 5. Discussion of the Epicenter Vertical Displacement for Some Hexagonal Crystals -- 6. Vertical Displacement Along the Epicentral-Axis Due to a Surface Point Load Acting Normal to the Surface -- 7. Body Forces Equivalent to Internal Discontinuities in an Anisotropic Elastic Solid -- References -- Author index.In this monograph I record those parts of the theory of transverse isotropic elastic wave propagation which lend themselves to an exact treatment, within the framework of linear theory. Emphasis is placed on transient wave motion problems in two- and three-dimensional unbounded and semibounded solids for which explicit results can be obtained, without resort to approximate methods of integration. The mathematical techniques used, many of which appear here in book form for the first time, will be of interest to applied mathematicians, engeneers and scientists whose specialty includes crystal acoustics, crystal optics, magnetogasdynamics, dislocation theory, seismology and fibre wound composites. My interest in the subject of anisotropic wave motion had its origin in the study of small deformations superposed on large deformations of elastic solids. By varying the initial stretch in a homogeneously deformed solid, it is possible to synthesize aniso tropic materials whose elastic parameters vary continuously. The range of the parameter variation is limited by stability considerations in the case of small deformations super posed on large deformation problems and (what is essentially the same thing) by the of hyperbolicity (solids whose parameters allow wave motion) for anisotropic notion solids. The full implication of hyperbolicity for anisotropic elastic solids has never been previously examined, and even now the constraints which it imposes on the elasticity constants have only been examined for the class of transversely isotropic (hexagonal crystals) materials.Physics.Mechanics.Applied mathematics.Engineering mathematics.Vibration.Dynamical systems.Dynamics.Physics.Mechanics.Vibration, Dynamical Systems, Control.Appl.Mathematics/Computational Methods of Engineering.Springer eBookshttp://dx.doi.org/10.1007/978-94-009-6866-0URN:ISBN:9789400968660 |