Spatial Filtering of Signals under Imprecise Calibration of Antenna Arrays

Shevchenko, M. E.; Malyshev, V. N.; Gorovoy, A. V.; Cherepanov, A. S.

doi:10.32603/1993-8985-2023-26-6-27-40

Izv. vysš. učebn. zaved. Ross., Radioèlektron.

2023

DOI: 10.32603/1993-8985-2023-26-6-27-40

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Spatial Filtering of Signals under Imprecise Calibration of Antenna Arrays

M. E. Shevchenko,

V. N. Malyshev,

A. V. Gorovoy

et al.

Abstract: Introduction. Spatial filtering of signals is performed for the selection the signals of interest when the signals spectra overlap. The quality of spatial filtering depends on the accuracy of antenna array (AA) calibration, which allows estimation of the amplitude-phase distribution (APD) at all possible directions of arrival, thus ensuring the identity of reception paths. A mismatch between the actual and measured APD values leads to quality degradation in all spatial filtering methods.Aim. To develop a metho… Show more

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2024

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Mapping of $L^2 -$norm of Two Multiplied $2\pi-$Periodic Functions to Their Fourier Coefficients (Part II)

Sharkas

2024

TJMCS

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This work derives an identity that maps between the $2$-norm of two multiplied $2\pi$-periodic functions in $L^2$ space (i.e., $||f.g||^2_{L^2 (-\pi,\pi)}$) to the individual Fourier coefficients of $f$ and $g$. Alternately, it maps between the $2$-norm of two multiplied discrete-time Fourier transforms (i.e., $||\mathscr{F}\{f\}.\mathscr{F}\{g\}||^2_{L^2 (-\pi,\pi)}$) to the discrete-time samples of $f$ and $g$. The results are equality to Cauchy–Schwarz inequality, and extend the results of our previous paper that map between $||f||^4_{L^4 (-\pi,\pi)}$ to the Fourier coefficients of $f$, alternately $||\mathscr{F}\{f\}||^4_{L^4 (-\pi,\pi)}$ to the discrete-time samples of $f$.

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Mapping of $L^2 -$norm of Two Multiplied $2\pi-$Periodic Functions to Their Fourier Coefficients (Part II)

Sharkas

2024

TJMCS

View full text Add to dashboard Cite

show abstract

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Spatial Filtering of Signals under Imprecise Calibration of Antenna Arrays

Cited by 1 publication

References 8 publications

Mapping of $L^2 -$norm of Two Multiplied $2\pi-$Periodic Functions to Their Fourier Coefficients (Part II)

Mapping of $L^2 -$norm of Two Multiplied $2\pi-$Periodic Functions to Their Fourier Coefficients (Part II)

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