resonansform

Resonansform is a proposed transform used in signal processing and applied physics to extract and highlight the resonant structure of a time-domain signal. It projects the signal onto a family of damped harmonic-oscillator kernels, so that components corresponding to natural frequencies and their associated damping are emphasized. The idea is to provide a spectrum-like representation that reflects how a system would respond to driven oscillations rather than just how the signal behaves in time or frequency alone.

Mathematically, the resonansform of a signal x(t) is defined by an integral of the form R(ω) = ∫_0^∞

Properties and relationships: The resonansform is linear and, under suitable conditions on the kernel, invertible, yielding

Applications and use cases: In vibration and structural health monitoring, resonansforms help identify natural frequencies and

Limitations: The reliability of a resonansform hinges on an appropriate kernel model and known or estimated