Carrier frequencies, holomorphy and unwinding

Abstract

We prove that functions of intrinsic-mode type (a classical models for signals) behave essentially like holomorphic functions: adding a pure carrier frequency eint ensures that the anti-holomorphic part is much smaller than the holomorphic part \| P-(f)\|L2 \|P+(f)\|L2. This enables us to use techniques from complex analysis, in particular the unwinding series. We study its stability and convergence properties and show that the unwinding series can stabilize and show that the unwinding series can provide a high resolution time-frequency representation, which is robust to noise.