| Popis: |
The usual passivity theorem considers a closed-loop, the direct chain of which consists of a strictly passive stable operator $H_{1}$, and the feedback chain of which consists of a passive operator $H_{2}$. Then the closed-loop is stable. Let $\rho >1$. We show here that the closed-loop is still stable when the direct chain consists of a strictly $\rho ^{-1}$-passive $% \rho ^{-1}$-stable operator (a weaker condition than above) and the feedback chain consists of a $\rho $-passive operator (a stronger condition than above). Variations on the theme of the small gain theorem (incremental or not) can be made similarly. This approach explains the results obtained in a paper on identification which was recently published. |
