Mathematical model of interaction of elastic L- and Sv-polarization waves with inhomogeneously deformed layer
Saved in:
| Date: | 2015 |
|---|---|
| Main Authors: | , |
| Format: | Article |
| Language: | English |
| Published: |
2015
|
| Series: | Physico-mathematical modelling and informational technologies |
| Online Access: | http://jnas.nbuv.gov.ua/article/UJRN-0000485222 |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| Journal Title: | Library portal of National Academy of Sciences of Ukraine | LibNAS |
Institution
Library portal of National Academy of Sciences of Ukraine | LibNASSimilar Items
Mathematical model of interaction of longitudinal elastic waves with a plane inhomogeneously deformed layer
by: O. Z. Kravchyshyn, et al.
Published: (2017)
by: O. Z. Kravchyshyn, et al.
Published: (2017)
Interaction of harmonic elastic SH-wave normal incidence with in-homogeneously deformed planar layer
by: O. Z. Kravchyshyn, et al.
Published: (2014)
by: O. Z. Kravchyshyn, et al.
Published: (2014)
The iteration method for determination of the angles of reflection/refraction of SH-wave under interaction with the inhomogeneously deformed elastic layer
by: O. Z. Kravchyshyn
Published: (2015)
by: O. Z. Kravchyshyn
Published: (2015)
Mathematical modeling of the interaction of polarized light with a structure containing a photoelastic layer
by: V. Chekurin, et al.
Published: (2015)
by: V. Chekurin, et al.
Published: (2015)
Mathematical model for interaction of normally incident elliptically polarized light with a stressed dielectric layer
by: V. Chekurin, et al.
Published: (2012)
by: V. Chekurin, et al.
Published: (2012)
Interaction of ultrasonic SH-polarization wave with 2d strain field in a plane layer
by: O. Z. Kravchyshyn, et al.
Published: (2013)
by: O. Z. Kravchyshyn, et al.
Published: (2013)
Mathematical model for interference of elastic waves in a geological medium with a stressed layer. The case of uniform compression
by: V. Chekurin, et al.
Published: (2011)
by: V. Chekurin, et al.
Published: (2011)
Mathematical modeling of wave fields in layered media with additional stresses
by: Malitsky, D. V., et al.
Published: (2012)
by: Malitsky, D. V., et al.
Published: (2012)
Propagation of Waves in an Elastic Layer Interacting with a Layer of Viscous Fluid
by: A. M. Bagno
Published: (2016)
by: A. M. Bagno
Published: (2016)
Mathematical model of scattering of a polarized wave on impedance strips located on screened dielectric layer
by: Yu. V. Gandel, et al.
Published: (2014)
by: Yu. V. Gandel, et al.
Published: (2014)
Mathematical modeling of elastic disturbance propagation in a structure containing a porous layer saturated with gas and water
by: V. Chekurin, et al.
Published: (2016)
by: V. Chekurin, et al.
Published: (2016)
To Evolution of SV-Wave with Bell-Shaped Initial Profile
by: Ja. Ja. Rushchitskij, et al.
Published: (2017)
by: Ja. Ja. Rushchitskij, et al.
Published: (2017)
Propagation of Waves in the Elastic Semi-space Interacting with Viscous Fluid Layer
by: A. M. Bagno
Published: (2020)
by: A. M. Bagno
Published: (2020)
On the dispersion of Lamb waves in an elastic layer interacting with the ideal liquid halfspace
by: A. M. Bagno
Published: (2017)
by: A. M. Bagno
Published: (2017)
Modeling the Processes of Nonlinear Deformation, Stability Loss, and Vibrations of Elastic Shells of Inhomogeneous Structure
by: O. P. Krivenko, et al.
Published: (2024)
by: O. P. Krivenko, et al.
Published: (2024)
On the effect of finite initial deformations on the phase velocities of normal waves in the elastic half-space interacting with the layer of an ideal compressible fluid
by: A. M. Bagno
Published: (2019)
by: A. M. Bagno
Published: (2019)
Mathematical simulation of the wave fields in the layered media under additional stress
by: D. V. Malytskyi, et al.
Published: (2012)
by: D. V. Malytskyi, et al.
Published: (2012)
On the effective interaction of waves in inhomogeneous, nonstationary media
by: Buts, V.A., et al.
Published: (2017)
by: Buts, V.A., et al.
Published: (2017)
Interaction of the modulated electron beam with inhomogeneous plasma: plasma density profile deformation and langmuir waves excitation
by: Anisimov, I.O., et al.
Published: (2005)
by: Anisimov, I.O., et al.
Published: (2005)
On the acoustic waves in a layer of a viscous fluid interacting with the elastic halfspace
by: A. N. Guz, et al.
Published: (2018)
by: A. N. Guz, et al.
Published: (2018)
Комментарий к статье Mostovoy, S.V. Mostovyi "Mathematical model of seismic signal, as a flow of physically non realizable single seismic waves"
by: Пилипенко, В.Н.
Published: (2016)
by: Пилипенко, В.Н.
Published: (2016)
On the effect of a viscous fluid on quasi-Lamb waves in an elastic layer that interacts with a liquid layer
by: A. M. Bagno
Published: (2016)
by: A. M. Bagno
Published: (2016)
Mathematical model of inhomogeneous cavity chain
by: Ayzatskiy, M.I., et al.
Published: (2004)
by: Ayzatskiy, M.I., et al.
Published: (2004)
On the localization of surface waves in the layer of an ideal compressible fluid interacting with the elastic half-space
by: A. M. Bagno
Published: (2018)
by: A. M. Bagno
Published: (2018)
Propagation of Quasi-Lamb Waves in Elastic Layer Interacting with the Half-Space of Viscous Fluid
by: A. N. Guz, et al.
Published: (2019)
by: A. N. Guz, et al.
Published: (2019)
On a surface wave along the cylindrical cavity in an inhomogeneous elastic material
by: Ya. Ya. Rushchytskyi
Published: (2019)
by: Ya. Ya. Rushchytskyi
Published: (2019)
Effect of Initial Stresses on the Generalized Lamb Waves in an Elastic Compressible Layer Interacting with a Layer of Viscous Fluid
by: O. M. Bahno
Published: (2023)
by: O. M. Bahno
Published: (2023)
On the influence of finite initial deformations on the phase velocities of quasi-Lamb waves in the incompressible elastic layer interacting with the half-space of a viscous compressible fluid
by: A. N. Guz, et al.
Published: (2019)
by: A. N. Guz, et al.
Published: (2019)
Mathematical model for IR emission tomography of temperature field in isotropic layer
by: V. F. Chekurin, et al.
Published: (2016)
by: V. F. Chekurin, et al.
Published: (2016)
On Lamb waves in the system: an ideal fluid layer – an elastic layer
by: A. M. Bagno
Published: (2015)
by: A. M. Bagno
Published: (2015)
Autonomous digital seismic stations SV
by: Gryn, D. M., et al.
Published: (2019)
by: Gryn, D. M., et al.
Published: (2019)
Autonomous digital seismic stations SV
by: D. M. Hryn, et al.
Published: (2019)
by: D. M. Hryn, et al.
Published: (2019)
Автономні цифрові сейсмічні станції SV
by: Гринь, Д.М., et al.
Published: (2019)
by: Гринь, Д.М., et al.
Published: (2019)
Non-Axisymmetric Waves in Layered Hollow Cylinders with Piezoceramic Radially Polarized Layers
by: Ja. Grigorenko, et al.
Published: (2013)
by: Ja. Grigorenko, et al.
Published: (2013)
Mathematical model for determining the temperature of surface coated with a heat-insulating layer
by: V. F. Chekurin, et al.
Published: (2020)
by: V. F. Chekurin, et al.
Published: (2020)
On the influence of finite initial deformations on the surface instability of the incompressible elastic layer interacting with the half-space of an ideal fluid
by: O. M. Bahno
Published: (2021)
by: O. M. Bahno
Published: (2021)
On the dispersion of waves in an elastic layer carrying the layer of a viscous fluid
by: A. M. Bagno
Published: (2015)
by: A. M. Bagno
Published: (2015)
On the nonstationary deforming of an elastic layer under mixed boundary conditions
by: V. D. Kubenko
Published: (2015)
by: V. D. Kubenko
Published: (2015)
Polarization-singular structure in laser images of phase-inhomogeneous layers to diagnose and classify their optical properties
by: Yu. O. Ushenko, et al.
Published: (2010)
by: Yu. O. Ushenko, et al.
Published: (2010)
Polarization-singular structure in laser images of phase-inhomogeneous layers to diagnose and classify their optical properties
by: Ushenko, Yu.O., et al.
Published: (2010)
by: Ushenko, Yu.O., et al.
Published: (2010)