We present an application of wavelet techniques to non-stationary time series with the aim of detecting the dependence structure which is typically found to characterize intraday stock index financial returns. It is particularly important to identify what components truly belong to the underlying volatility process, compared with those features appearing instead as a result of the presence of disturbance processes. The latter may yield misleading inference results when standard financial time series models are adopted. There is no universal agreement on whether long memory really affects financial series, or instead whether it could be that non-stationarity, once detected and accounted for, may allow for more power in detecting the dependen...
Time series analysis is an essential research area for those who are dealing with scientific and eng...
This chapter presents a set of tools, which allow gathering information about the frequency componen...
Wavelets allow for a more flexible characterization of time series than both spectral and classical ...
We present an application of wavelet techniques to non-stationary time series with the aim of detect...
Conventional time series theory and spectral analysis have independently achieved significant popula...
Financial time series analysis is a highly empirical discipline concerned with the evolution of the...
<div><p>This paper demonstrates the utilization of wavelet-based tools for the analysis and predicti...
We show that decomposing a class of signals with overcomplete dictionaries of functions and combini...
Wavelets orthogonally decompose data into different frequency components, and the temporal and frequ...
textabstractWe briefly describe the major advantages of using the wavelet transform for the processi...
Wavelets by construction are able to show us “the forest as well as the trees”. They are compactly s...
textabstractWe briefly describe the major advantages of using the wavelet transform for the processi...
Wavelets orthogonally decompose data into different frequency components, and the temporal and frequ...
Summary. We present and study the performance of the semiparametric wavelet estimator for the long{m...
Memory in finance is the foundation of a well-established forecasting model, and new financial theor...
Time series analysis is an essential research area for those who are dealing with scientific and eng...
This chapter presents a set of tools, which allow gathering information about the frequency componen...
Wavelets allow for a more flexible characterization of time series than both spectral and classical ...
We present an application of wavelet techniques to non-stationary time series with the aim of detect...
Conventional time series theory and spectral analysis have independently achieved significant popula...
Financial time series analysis is a highly empirical discipline concerned with the evolution of the...
<div><p>This paper demonstrates the utilization of wavelet-based tools for the analysis and predicti...
We show that decomposing a class of signals with overcomplete dictionaries of functions and combini...
Wavelets orthogonally decompose data into different frequency components, and the temporal and frequ...
textabstractWe briefly describe the major advantages of using the wavelet transform for the processi...
Wavelets by construction are able to show us “the forest as well as the trees”. They are compactly s...
textabstractWe briefly describe the major advantages of using the wavelet transform for the processi...
Wavelets orthogonally decompose data into different frequency components, and the temporal and frequ...
Summary. We present and study the performance of the semiparametric wavelet estimator for the long{m...
Memory in finance is the foundation of a well-established forecasting model, and new financial theor...
Time series analysis is an essential research area for those who are dealing with scientific and eng...
This chapter presents a set of tools, which allow gathering information about the frequency componen...
Wavelets allow for a more flexible characterization of time series than both spectral and classical ...