Block Krylov Recycling Algorithms for FETI-2LM Applied to 3-D Electromagnetic Wave Scattering and Radiation

Roux, François‐Xavier; Barka, André

doi:10.1109/tap.2017.2670541

Cited by 17 publications

(18 citation statements)

References 22 publications

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“…This method has also demonstrated its effectiveness for simulating linearly independent multi-source (TEM mode feeds) problems with the implementation of Block Krylov Recycling Strategy (BKRS) and improves significantly the previous works of [4], [5] and [6]. The efficiency of the method for linearly independent feeds (in our application the 200 surrounded antenna near fields are significantly different) as already been demonstrated in [9] for array antennas where gains in computation time of around 11 have been observed. Each sub-domain of our decomposition belonging to a limited set of unit-cell meshes (antenna, air and groud plane subdomains), is locally meshed with an automatic procedure of the GID preprocessor [12] based on GID batch files and T cl scripts [13].…”

Section: Introductionsupporting

confidence: 58%

“…Recently [1], to overcome the calculation difficulties indicated above, the simulation of the large size GRAVES sparse array has been performed with the Finite Element Tearing and Interconnecting using two Lagrange multipliers (FETI-2LM) technique [3], [9], [10] implemented in ONERA's FACTOPO code. The originality is that the complete mesh is not built upstream of the resolution of the electromagnetic problem avoiding the use of specific mesh splitter tools such as METIS [11] to decompose the large scale initial mesh.…”

Section: Introductionmentioning

confidence: 99%

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Improvement of DDM Preprocessing for the Simulation of the GRAVES Radar Densified Sparse Array for Space Surveillance and Tracking

Barka¹,

Barka²

2020

Antennas Wirel. Propag. Lett.

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Section: Introductionsupporting

confidence: 58%

Section: Introductionmentioning

confidence: 99%

Improvement of DDM Preprocessing for the Simulation of the GRAVES Radar Densified Sparse Array for Space Surveillance and Tracking

Barka¹,

Barka²

2020

Antennas Wirel. Propag. Lett.

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“…Step by step description 1) Field expansion on the n th TEM ports of the array: On each antenna port, the electric and magnetic fields (E n and H n ) are expanding using incoming (e n , h n ) and outgoing (e n , −h n ) TEM electromagnetic modal waves [17] of amplitudes a n and b n . 2) Solving the FEM problem: The Generalized Admittance Matrix (GAM) of the array is first FEM-computed with the FETI-2LM domain decomposition method [14] and converted to a Generalized Scattering Matrix (GSM) 'S' as proposed in [6].…”

Section: Domain Decomposition For Gsm Extractionmentioning

confidence: 99%

“…However, the methodology to extract the scattering matrix of the array is based on a mix of periodic approximations (for the center elements) and partial local embedded zones for the border elements of the array. In this work, so as to efficiently calculate the embedded radiation patterns of all the radiating elements (internal and boundary radiating elements) as well as the complete Scattering Matrix [6] of the array, we discuss the interest of the implementation of the FETI-2LM domain decomposition methods taking into account the finitude o f t he a rray on massively parallel computers initially developed in [14] and optimized in [15] and [16] for large size sparse arrays. The main goal is to implement a method allowing in a first step to calculate the radiating elements radiation patterns and the GSM of the array, and in a second post processing step to calculate the gain patterns of the antenna array for azimuth and elevation scanning directions while taking into account the active reflection c oefficient.…”

Section: Introductionmentioning

confidence: 99%

Simulation of Active Reflection Coefficient Phenomena of Large Antenna Array Using FEM Domain Decomposition Methods

Barka

Jacquinot²

2020

Antennas Wirel. Propag. Lett.

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This paper proposes the application of the Finite Element Tearing and Interconnecting method (FETI-2LM) a Domain Decompositon Method (DDM) [1], [2] for the full-wave simulation of large antenna array (few thousands of radiating elements). The proposed methodology makes it possible to efficiently calculate in a post-processing step the antenna patterns for steering directions within the desired field of view while taking into account the active reflection coefficients. The methodology is based on an efficient extraction of the embedded radiating elements far field radiation patterns as well as the Generalized Scattering Matrix (GSM) [3] of the array by implementing massively parallel computers. The beauty of the GSM is its capability to handle the active S-parameters independently of the steering direction. This permits to generate the angulardependent active reflection coefficients by post-processing. This implementation is a step forward to provide us with a tool that permits to evaluate by simulation large antenna array while taking into account all the phenomena and interactions that may degrade the key performances that are required at a higher level, to specify a global system before fabrication.

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“…These side lobes can be suppressed by controlling the control parameters of the antenna arrays. [4][5][6][7][8][9] Different optimization techniques like particle swarm optimization (PSO), [10][11][12][13][14][15][16][17][18][19] genetic algorithm (GA), 20 block Krylov recycling algorithms, 21 hybrid technique, 22 Chichen swarm optimization, 23 using integral operator, 24 PSO, 25 bat algorithm, 26 differential evolution (DE) 21 are being used in the field of the antenna and electromagnetic as well as other fields of engineering and real-life application.…”

Section: Introductionmentioning

confidence: 99%

Evolutionary optimization for pattern synthesis and reduction of mutual coupling of linear antenna arrays

Ram

2020

Int J Communication

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SummaryOptimal design of antenna arrays to minimize the mutual coupling effects in the geometrical arrangements of the linear antenna array (LAA) and circular antenna array (CAA) is dealt with in this work. Two different cases are considered to reduce the effect of LAA and CAA: Case‐1 in which the current excitations of the antenna array are considered to get the optimal radiation pattern of two geometry called LAA and CAA and Case‐2 in which inter‐element spacing and current excitations are both optimized for LAA geometry. A cost function that involves the mutual coupling factor as an optimization factor is developed to reduce the side lobe level (SLL), which takes mutual coupling effects into consideration. Excitation values and inter‐elemental spacing are optimized using particle swarm optimization (PSO). In LAA, for 8‐, 12‐, 16‐element arrays, SLLs are reduced by −15.52, −16.71, and −17.78 dB in Case‐1. For the same sets of element arrays, SLLs were reduced by −17.35, −19.71, and −20.26 dB in Case‐2. In CAA, the current excitations of the antenna array are optimized. For 8‐, 12‐, and 16‐ element arrays, SLLs are reduced to −7.405, −10.52, and −9.43 dB, respectively. The arrays coded with the help of MATLAB based computation and the results obtained by MATLAB are validated by using CST.

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Block Krylov Recycling Algorithms for FETI-2LM Applied to 3-D Electromagnetic Wave Scattering and Radiation

Cited by 17 publications

References 22 publications

Improvement of DDM Preprocessing for the Simulation of the GRAVES Radar Densified Sparse Array for Space Surveillance and Tracking

Improvement of DDM Preprocessing for the Simulation of the GRAVES Radar Densified Sparse Array for Space Surveillance and Tracking

Simulation of Active Reflection Coefficient Phenomena of Large Antenna Array Using FEM Domain Decomposition Methods

Evolutionary optimization for pattern synthesis and reduction of mutual coupling of linear antenna arrays

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