Signal recovery from a few linear measurements of its high-order spectra

“…2) Phase preservation: Spectra of order greater than 2 are not blind to time in the same way but preserve information about temporal structure, up to the discarded time shift. In fact, for a transient signal, whose HOS is non-vanishing almost everywhere (by virtue of having a finite duration), it is possible to uniquely recover a waveform from HOS, up to time shift and, in the case of even orders, sign inversion [2], [47].…”

“…7) HOS inversion: For systems whose outputs are both transient and have deterministic HOS, it is not only possible to recover the signal from HOS, but HOS overdetermine the signal, meaning that it is not necessary to estimate HOS over the entire domain to fully recover the signal phase spectrum. The minimum number of HOS samples for recovery is on the order of the number of samples in the original signal [47]. For example, from the bispectrum, one can reconstruct a transient, deterministic signal from the diagonal axis X (ω) X (ω) X * (2ω).…”

“…3) Filter estimation: For each segment of data, a partial delay filter estimate was obtained following (14) as where F (n) is updated as the shifted average in (47). The iteration was repeated for a fixed number of 50 iterations.…”

A Slice of Trispectrum for Patterns of Modulation

“…2) Phase preservation: Spectra of order greater than 2 are not blind to time in the same way but preserve information about temporal structure, up to the discarded time shift. In fact, for a transient signal, whose HOS is non-vanishing almost everywhere (by virtue of having a finite duration), it is possible to uniquely recover a waveform from HOS, up to time shift and, in the case of even orders, sign inversion [2], [47].…”

“…7) HOS inversion: For systems whose outputs are both transient and have deterministic HOS, it is not only possible to recover the signal from HOS, but HOS overdetermine the signal, meaning that it is not necessary to estimate HOS over the entire domain to fully recover the signal phase spectrum. The minimum number of HOS samples for recovery is on the order of the number of samples in the original signal [47]. For example, from the bispectrum, one can reconstruct a transient, deterministic signal from the diagonal axis X (ω) X (ω) X * (2ω).…”

“…3) Filter estimation: For each segment of data, a partial delay filter estimate was obtained following (14) as where F (n) is updated as the shifted average in (47). The iteration was repeated for a fixed number of 50 iterations.…”

A Slice of Trispectrum for Patterns of Modulation

“…2) Phase preservation: Spectra of order greater than 2 are not blind to time in the same way but preserve information about temporal structure, up to the discarded time shift. In fact, for a transient signal, whose HOS is non-vanishing almost everywhere (by virtue of having a finite duration), it is possible to uniquely recover a waveform from HOS, up to time shift and, in the case of even orders, sign inversion [2], [47].…”

“…7) HOS inversion: For systems whose outputs are both transient and have deterministic HOS, it is not only possible to recover the signal from HOS, but HOS overdetermine the signal, meaning that it is not necessary to estimate HOS over the entire domain to fully recover the signal phase spectrum. The minimum number of HOS samples for recovery is on the order of the number of samples in the original signal [47]. For example, from the bispectrum, one can reconstruct a transient, deterministic signal from the diagonal axis X (ω) X (ω) X * (2ω).…”

A Slice of Trispectrum for Patterns of Modulation

Near-Optimal Bounds for Signal Recovery from Blind Phaseless Periodic Short-Time Fourier Transform