Q
Qiang-Ming Cai
Researcher at Southwest University of Science and Technology
Publications - 72
Citations - 218
Qiang-Ming Cai is an academic researcher from Southwest University of Science and Technology. The author has contributed to research in topics: Integral equation & Basis function. The author has an hindex of 6, co-authored 51 publications receiving 125 citations. Previous affiliations of Qiang-Ming Cai include University of Electronic Science and Technology of China.
Papers
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Scanning Enhanced Low-Profile Broadband Phased Array With Radiator-Sharing Approach and Defected Ground Structures
TL;DR: In this paper, a low-profile broadband phased array with defected ground structures (DGSs) is presented, which is based on the radiator-sharing approach and DGSs.
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Volume Surface Integral Equation Method Based on Higher Order Hierarchical Vector Basis Functions for EM Scattering and Radiation From Composite Metallic and Dielectric Structures
Qiang-Ming Cai,Yanwen Zhao,Wei-Feng Huang,Yu-Teng Zheng,Zhi-Peng Zhang,Zaiping Nie,Qing Huo Liu +6 more
TL;DR: A novel Galerkin-type method of moments solution of the volume surface integral equation (VSIE), which is developed for the analysis of electromagnetic scattering and radiation from composite metallic and dielectric structures, is presented.
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Volume Integral Equation With Higher Order Hierarchical Basis Functions for Analysis of Dielectric Electromagnetic Scattering
TL;DR: In this paper, an efficient method of moments (MoM) solution of volume electric field integral equation (V-EFIE) with a kind of higher order basis functions is presented to model scattering from a dielectric object with arbitrary shapes and inhomogenuity.
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MLACE-MLFMA Combined With Reduced Basis Method for Efficient Wideband Electromagnetic Scattering From Metallic Targets
TL;DR: A fast interpolation algorithm is proposed for the first time by leveraging the benefits of the MLACE, the classical MLFMA, and the RBM; furthermore, a novel nonblind sampling method (NBSM) is proposed to approximate an orthogonal subspace for theMLACE-MLFMA-RBM.
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Nonconformal Discretization of Electric Current Volume Integral Equation With Higher Order Hierarchical Vector Basis Functions
Qiang-Ming Cai,Zhi-Peng Zhang,Yanwen Zhao,Wei-Feng Huang,Yu-Teng Zheng,Zaiping Nie,Qing Huo Liu +6 more
TL;DR: A nonconformal discretization of the electric current volume integral equation (JVIE) is presented for the electromagnetic scattering analysis of inhomogeneous dielectric objects based on higher order geometrical and current modeling, where curved tetrahedral elements and higher order hierarchical vector (HOHV) basis functions are adopted.