Abstract
Consider the equation
\(\displaystyle \dot y = Ay + b f(s,t)\quad (s=cy, t\geq 0). \quad\quad (1.1) \)
where A is a real constant Hurwitz \(\displaystyle n \times n\)-matrix, b is a real column, c is a real row, f maps \(\displaystyle \mathbf{R}^1 \times [0, \infty) into \mathbf{R}^1\) with the property
\(\displaystyle \vert f(s,t)\vert \leq q\vert s\vert~\mbox{for~all}~s \in \mathbf{R}^1~\mbox{and}~t\geq 0. \quad\quad (1.2) \)
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Gil’, M.I. 6. The Aizerman Problem. In: Explicit Stability Conditions for Continuous Systems. Lecture Notes in Control and Information Science, vol 314. Springer, Berlin, Heidelberg. https://doi.org/10.1007/11311959_7
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DOI: https://doi.org/10.1007/11311959_7
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