| Popis: |
While ridges in the scalogram, determined by the squared modulus of analytic wavelet transform (AWT), have been widely applied in time series analysis and time-frequency analysis, their behavior in noisy environments remains underexplored. We fill in this gap in this paper. We define ridges as paths formed by local maximizers of the scalogram along the scale axis, and analyze their properties when the signal is contaminated by stationary Gaussian noise. In addition to establishing several key properties of the AWT for random processes, we investigate the probabilistic characteristics of the resulting random ridge points in the scalogram. Specifically, we establish the uniqueness property of the ridge point at individual time instances and prove the upper hemicontinuity of the set of ridge points. Furthermore, we derive bounds on the probability that the deviation between the ridge points of noisy and clean signals exceeds a specified threshold. These bounds are expressed in terms of constants related to the signal-to-noise ratio and apply when the signal satisfies the adaptive harmonic model and is corrupted by a stationary Gaussian process. To achieve these results, we derive maximal inequalities for the complex modulus of nonstationary Gaussian processes, leveraging classical tools such as the Borell-TIS inequality and Dudley's theorem, which might be of independent interest. |
