Testing Equality of Spectral Density Operators for Functional Processes
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The problem of testing equality of the entire second order structure of two independent functional processes is considered. A fully functional L^2-type test is developed which evaluates, over all frequencies, the Hilbert-Schmidt distance between the estimated spectral density operators of the two processes. Under the assumption of a linear functional process, the asymptotic behavior of the test statistic is investigated and its limiting distribution under the null hypothesis is derived. Furthermore, a novel frequency domain bootstrap method is developed which leads to a more accurate approximation of the distribution of the test statistic under the null than the large sample Gaussian approximation derived. Asymptotic validity of the bootstrap procedure is established under very general conditions and consistency of the bootstrap-based test under the alternative is proved. Numerical simulations show that, even for small samples, the bootstrap-based test has a very good size and power behavior. An application to a bivariate real-life functional time series is also presented.
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