We study continuous-time multidimensional wide- sense stationary (WSS) and (almost) cyclostationary processes in the frequency domain. Under the assumption that the correlation function is uniformly continuous, we prove the existence of a unique sequence of spectral measures, which coincide with the restrictions to certain subdiagonals of the spectral measure in the strongly harmonizable case. Moreover, the off-diagonal measures are absolutely continuous with respect to the diagonal measure. As a consequence, for strongly harmonizable scalar improper almost cyclostationary processes, we obtain representation formulas for the components of the complementary spectral measure and the off-diagonal components of the spectral measure, in terms of...
AbstractA complete characterization of the spectrum of a locally square integrable periodically corr...
Dedicated to the memory of wise Ukrainian mathematician A. Ya. Povzner Abstract. We study the spectr...
The present state of mathematical diffraction theory for systems with continuous spectral components...
This paper addresses the representation of continuous-time strongly harmonizable periodically correl...
AbstractThis paper addresses the representation of continuous-time strongly harmonizable periodicall...
Recent developments and applications of cyclostationary signal analysis are reviewed in the companio...
A second-order stochastic process X is called almost periodically correlated (PC) in the sense of Gl...
In this paper a characterization of the spectrum and the random spectrum of a bounded continuous par...
The meromorphic functional calculus developed in Part I overcomes the nondiagonalizability of linear...
Spectral analysis of stationary processes has played an essential role in the development of Time Se...
In this paper some properties of the correlation autoregressive (CAR) sequences are studied. A repre...
AbstractA second-order stochastic process X is called almost periodically correlated (PC) in the sen...
In this section, cyclostationary signals are characterized and their spectral analysis is provided. ...
The properties of cyclostationary process’ stationary components, selected using bandpass filtering,...
AbstractThis paper deals with the spectrum of the almost periodically correlated (APC) processes def...
AbstractA complete characterization of the spectrum of a locally square integrable periodically corr...
Dedicated to the memory of wise Ukrainian mathematician A. Ya. Povzner Abstract. We study the spectr...
The present state of mathematical diffraction theory for systems with continuous spectral components...
This paper addresses the representation of continuous-time strongly harmonizable periodically correl...
AbstractThis paper addresses the representation of continuous-time strongly harmonizable periodicall...
Recent developments and applications of cyclostationary signal analysis are reviewed in the companio...
A second-order stochastic process X is called almost periodically correlated (PC) in the sense of Gl...
In this paper a characterization of the spectrum and the random spectrum of a bounded continuous par...
The meromorphic functional calculus developed in Part I overcomes the nondiagonalizability of linear...
Spectral analysis of stationary processes has played an essential role in the development of Time Se...
In this paper some properties of the correlation autoregressive (CAR) sequences are studied. A repre...
AbstractA second-order stochastic process X is called almost periodically correlated (PC) in the sen...
In this section, cyclostationary signals are characterized and their spectral analysis is provided. ...
The properties of cyclostationary process’ stationary components, selected using bandpass filtering,...
AbstractThis paper deals with the spectrum of the almost periodically correlated (APC) processes def...
AbstractA complete characterization of the spectrum of a locally square integrable periodically corr...
Dedicated to the memory of wise Ukrainian mathematician A. Ya. Povzner Abstract. We study the spectr...
The present state of mathematical diffraction theory for systems with continuous spectral components...