Nonconforming Discretization of the Electric-Field Integral Equation for Closed Perfectly Conducting Objects

Úbeda, Eduard; Rius, J.M.; Heldring, A.

doi:10.1109/tap.2014.2325954

Cited by 38 publications

(49 citation statements)

References 27 publications

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“…The current I(s) along the wire satisfies the following electric field integral equation (EFIE) [4,[26][27][28][29]:…”

Section: Mom Calculations For Vlf Umbrella Antenna Arraymentioning

confidence: 99%

A Moment-Based Study on the Impedance Effect of Mutual Coupling for VLF Umbrella Antenna Arrays

Li¹,

Liu²,

Wu³

2017

PIER C

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Abstract-The mutual coupling between very low frequency (VLF) antenna elements is an important factor affecting the radiation performance of umbrella antenna arrays. This study evaluates the factors influencing the mutual coupling between the elements of an umbrella antenna array. We develop a mutual coupling analysis method for calculating the input impedances of a VLF antenna based on the impedance effect of mutual coupling. The radiation resistance of the VLF umbrella antenna can be obtained using numeric integral from Method of Moments (MoM) solution. Using the FEKO simulation software, a model of a trideco-tower umbrella antenna array is established. The electrical parameters of the VLF umbrella antenna array on inhomogeneous ground are calculated for both single and dual feeding modes. The impedance characteristics of the umbrella antenna arrays are also simulated for different array inter-element spacings on homogeneous ground. Representative numerical results are reported and discussed to assess the mutual coupling effect of the proposed method in comparison with full-wave simulations.

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“…The current I(s) along the wire satisfies the following electric field integral equation (EFIE) [4,[26][27][28][29]:…”

Section: Mom Calculations For Vlf Umbrella Antenna Arraymentioning

confidence: 99%

A Moment-Based Study on the Impedance Effect of Mutual Coupling for VLF Umbrella Antenna Arrays

Li¹,

Liu²,

Wu³

2017

PIER C

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“…The monopolar-RWG space of current can be decomposed into two edge-oriented subspaces of current, such that the basis functions are defined in terms of the type of transition of the normal component of the current across edges [4] …”

Section: Low-frequency Stabilitymentioning

confidence: 99%

“…The resulting numerical implementations are little demanding in computational terms because the hypersingular Kernel contributions are cancelled out [2]. Recently, nonconforming schemes based on the facet-oriented monopolar-RWG set [3], with no interelement continuity constraint, have been developed for the discretization of the EFIE in the EM scattering analysis of closed conductors [4] [5]. These implementations carry out the numerical evaluation of the hypersingular Kernel contributions by testing the fields over volumetric subdomains inside the body, tetrahedral elements [4] or wedges [5], attached to the surface triangulation.…”

Section: Introductionmentioning

confidence: 99%

“…Recently, nonconforming schemes based on the facet-oriented monopolar-RWG set [3], with no interelement continuity constraint, have been developed for the discretization of the EFIE in the EM scattering analysis of closed conductors [4] [5]. These implementations carry out the numerical evaluation of the hypersingular Kernel contributions by testing the fields over volumetric subdomains inside the body, tetrahedral elements [4] or wedges [5], attached to the surface triangulation. However, the generation of the impedance matrix elements becomes rather elaborate and more time-consuming than the conventional surface-tested Galerkin RWG-discretization.…”

Section: Introductionmentioning

confidence: 99%

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Tangential-Normal Surface Testing for the Nonconforming Discretization of the Electric-Field Integral Equation

Úbeda

Sekulić

Rius

et al. 2016

Antennas Wirel. Propag. Lett.

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Abstract-Nonconforming implementations of the ElectricField Integral Equation (EFIE), based on the facet-oriented monopolar-RWG set, impose no continuity constraints in the expansion of the current between adjacent facets. These schemes become more versatile than the traditional edge-oriented schemes, based on the RWG set, because they simplify the management of junctions in composite objects and allow the analysis of nonconformal triangulations. Moreover, for closed moderately small conductors with edges and corners, they show improved accuracy with respect to the conventional RWGdiscretization. However, they lead to elaborate numerical schemes because the fields are tested inside the body, near the boundary surface, over volumetric subdomains attached to the surface meshing. In this paper, we present a new nonconforming discretization of the EFIE that results from testing with RWG functions over pairs of triangles such that one triangle matches one facet of the surface triangulation and the other one is oriented perpendicularly, inside the body. This "tangentialnormal" testing scheme, based on surface integrals, simplifies considerably the matrix generation when compared with the volumetrically tested approaches. Index Terms-Basis functions, electric field integral equation (EFIE), integral equations, moment method

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“…However, generating conformal discretizations for engineering system-level simulations is far from trivial, as the complexity of modern engineering applications increases at a fast pace. Among the previous works addressing the above mentioned deficiencies, we mention recent works [28][29][30][31][32].…”

Section: Discontinuous Galerkin Formulationmentioning

confidence: 99%

ADAPTIVE AND PARALLEL SURFACE INTEGRAL EQUATION SOLVERS FOR VERY LARGE-SCALE ELECTROMAGNETIC MODELING AND SIMULATION (Invited Paper)

MacKie-Mason¹,

Greenwood²,

Peng³

2015

PIER

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Abstract-This work investigates an adaptive, parallel and scalable integral equation solver for very large-scale electromagnetic modeling and simulation. A complicated surface model is decomposed into a collection of components, all of which are discretized independently and concurrently using a discontinuous Galerkin boundary element method. An additive Schwarz domain decomposition method is proposed next for the efficient and robust solution of linear systems resulting from discontinuous Galerkin discretizations. The work leads to a rapidly-convergent integral equation solver that is scalable for large multi-scale objects. Furthermore, it serves as a basis for parallel and scalable computational algorithms to reduce the time complexity via advanced distributed computing systems. Numerical experiments are performed on large computer clusters to characterize the performance of the proposed method. Finally, the capability and benefits of the resulting algorithms are exploited and illustrated through different types of real-world applications on high performance computing systems.

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Nonconforming Discretization of the Electric-Field Integral Equation for Closed Perfectly Conducting Objects

Cited by 38 publications

References 27 publications

A Moment-Based Study on the Impedance Effect of Mutual Coupling for VLF Umbrella Antenna Arrays

A Moment-Based Study on the Impedance Effect of Mutual Coupling for VLF Umbrella Antenna Arrays

Tangential-Normal Surface Testing for the Nonconforming Discretization of the Electric-Field Integral Equation

ADAPTIVE AND PARALLEL SURFACE INTEGRAL EQUATION SOLVERS FOR VERY LARGE-SCALE ELECTROMAGNETIC MODELING AND SIMULATION (Invited Paper)

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