Pages that link to "Item:Q3544490"
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The following pages link to Many-body wave scattering by small bodies and applications (Q3544490):
Displaying 31 items.
- Multiscale analysis of the acoustic scattering by many scatterers of impedance type (Q322124) (← links)
- Wave scattering by small bodies and creating materials with a desired refraction coefficient (Q351532) (← links)
- Wave scattering by many small bodies: transmission boundary conditions (Q362117) (← links)
- Scattering of electromagnetic waves by many nano-wires (Q401772) (← links)
- Preparing materials with a desired refraction coefficient pages (Q419733) (← links)
- The equivalent refraction index for the acoustic scattering by many small obstacles: with error estimates (Q481991) (← links)
- A recipe for making materials with negative refraction in acoustics (Q637292) (← links)
- Wave scattering by many small particles embedded in a medium (Q637683) (← links)
- Electromagnetic wave scattering by small bodies (Q716806) (← links)
- On the theory of multiple scattering of waves and the optical potential for a system of point-like scatterers. An application to the theory of ultracold neutrons (Q820289) (← links)
- Asymptotics of the solution to Robin problem (Q952155) (← links)
- Small angle scattering and \(X\)-ray transform in classical mechanics (Q1774797) (← links)
- Wave scattering by many small impedance particles and applications (Q2106337) (← links)
- Many-body wave scattering problems in the case of small scatterers (Q2511158) (← links)
- Electromagnetic wave scattering by small impedance particles of an arbitrary shape (Q2511403) (← links)
- Application of the asymptotic solution to EM field scattering problem for creation of media with prescribed permeability (Q2511470) (← links)
- A METHOD FOR CREATING MATERIALS WITH A DESIRED REFRACTION COEFFICIENT (Q3002051) (← links)
- A cluster of many small holes with negative imaginary surface impedances may generate a negative refraction index (Q3188521) (← links)
- Electromagnetic wave scattering by small perfectly conducting particles and applications (Q3189959) (← links)
- (Q3198240) (← links)
- The Foldy-Lax approximation of the scattered waves by many small bodies for the Lamé system (Q3465956) (← links)
- Creating desired potentials by embedding small inhomogeneities (Q3583772) (← links)
- SOME RESULTS ON INVERSE SCATTERING (Q3607510) (← links)
- Estimation of the Heat Conducted by a Cluster of Small Cavities and Characterization of the Equivalent Heat Conduction (Q5222108) (← links)
- On the Justification of the Foldy--Lax Approximation for the Acoustic Scattering by Small Rigid Bodies of Arbitrary Shapes (Q5250323) (← links)
- Wave scattering by many small bodies and applications (Q5256251) (← links)
- Foldy–Lax approximation on multiple scattering by many small scatterers (Q5404681) (← links)
- Optical potential and propagators for elastic and inelastic scattering from many-body targets (Q5949951) (← links)
- Approximation by multipoles of the multiple acoustic scattering by small obstacles in three dimensions and application to the Foldy theory of isotropic scattering (Q5962880) (← links)
- The effective permittivity and permeability generated by a cluster of moderately contrasting nanoparticles (Q6155342) (← links)
- Wave propagation in pure-time modulated step media with applications to temporal-aiming (Q6612344) (← links)
