Muhammad Arshad Fiaz scite author profile

An analytical-numerical technique for the scattering problem of a plane wave by a cylinder buried under a rough surface, based on the Cylindrical Wave Approach, is presented. The rough deviations on the interface are dealt with by means of the Small Perturbation Method. Reflection and transmission coefficients are evaluated in a first order approximation, and fields are the sum of a zeroth-order solution, relevant to flat surface, and first-order perturbation fields, associated to the surface roughnesses. Numerical results are obtained through an exact evaluation of the spectral integrals, giving results both in nearand far-field regions, for the case of an interface with sinusoidal profile. The approach is validated through comparisons with the literature, and results showing the effect of geometrical and physical parameters on the scattered field are reported.

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High-Frequency Expressions for the Field in the Caustic Region of a PEMC Cylindrical Reflector Using Maslov's Method

Fiaz

Ghaffar

Naqvi

2008

Journal of Electromagnetic Waves and Applications

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Asymptotic solution for a scattered field by cylindrical objects buried beneath a slightly rough surface

Fiaz

Frezza²,

Pajewski

et al. 2012

Near Surface Geophysics

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High-Frequency Expression for the Field in the Caustic Region of a Pemc Gregorian System Using Maslov's Method

Fiaz¹,

Aziz²,

Ghaffar³

et al. 2008

PIER

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Abstract-Method proposed by Maslov has been used, to remedy the problem of geometrical optics, for a two dimensional Perfect electromagnetic conductor (PEMC) Gregorian system. It generates an integral form of solution near the caustic that can be evaluated analytically/numerically, or with uniform asymptotic techniques. Away from the caustic it recovers the geometrical optics field. Numerical computations are made to calculate the field around the caustic of a Gregorian system.

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Scattering from a cylindrical obstacle deeply buried beneath a planar non-integer dimensional dielectric slab using Kobayashi potential method

Batool

Naqvi

Fiaz

2018

Optik - International Journal for Light and Electron Optics

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