Abstract
We reduce the boundary-value problem of the diffraction of a plane electromagnetic wave by a structure, which consists of a strip grating, a metamaterial layer, and magnetized plasma, to a system of linear algebraic second-kind equations with the kernel operator. Resonance properties of this structure are studied, and it is found that in the low-frequency range, it has several series of an infinite number of resonance frequencies with condensation points at certain finite frequencies.
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