kvadratuurikomponenttiin

Kvadratuurikomponenttiin refers to a concept in signal processing, particularly in the context of analytic signals. It represents the component of a signal that is 90 degrees out of phase with the original signal. When a signal $x(t)$ is transformed into its analytic signal $z(t)$, the analytic signal is typically expressed as $z(t) = x(t) + i \hat{x}(t)$, where $i$ is the imaginary unit and $\hat{x}(t)$ is the Hilbert transform of $x(t)$. In this representation, $x(t)$ is considered the in-phase component, and $\hat{x}(t)$ is the quadrature component.

The Hilbert transform shifts the phase of each frequency component of the original signal by $-\pi/2$ (or

Applications of the quadrature component and the analytic signal are found in areas such as amplitude modulation