Show pageOld revisionsBacklinksExport to PDFBack to top This page is read only. You can view the source, but not change it. Ask your administrator if you think this is wrong. ====== BIBO stability ====== A system is bounded-in bounded-out (BIBO) stable if a bounded input will result in a bounded output. A system with unit sample response $h[n]$ will be BIBO stable if and only if $h[n]$ is absolutely summable. That is: $$ \sum_{n=-\infty}^{\infty} |h[n]| < \infty $$ A BIBO stable system is guaranteed to have a [[kb:fourier_transform]], since: $$ |H(j\omega)| = |\int_{-\infty}^{\infty} h(t) e^{-j\omega t} dt| \leq \int_{-\infty}^{\infty} |h(t)| dt < \infty $$ We can use this property to conclude that the [[kb:region_of_convergence|region of convergence]] of any BIBO stable system must include the Fourier transform. In the [[kb:z-transform|z-domain]], the Fourier transform corresponds to a unit circle in the complex z-plane, and in the [[kb:laplace_transform|Laplace domain]], the Fourier transform corresponds to the imaginary axis. kb/bibo_stability.txt Last modified: 2024-04-30 04:03by 127.0.0.1