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Hence, (3.2) is strongly stable.
System (3.2) is strongly stable.
(i) System (3.2) is strongly stable.
Suppose that (3.2) is strongly stable.
Then (3.2) is strongly stable if and only if (3.27) is strongly stable.
It follows from Theorem 3.21 that (3.27) is strongly stable.
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The system is said to be strongly stable if for every user, (5).
The solution of (3.1) is said to be strongly stable if, for each, there exists a such that, for any solution of (3.1), the inequalities and imply for all.
Definition 3.1 A sequence { Y n, n ≥ 1 } is said to be strongly stable if there exist two constant sequences { b n, n ≥ 1 } and { d n, n ≥ 1 } with 0 < b n ↑ ∞ such that b n − 1 Y n − d n → 0 a.s.s
It is proved in this paper that the combined method is strongly A-stable when θ∈[2/3,1.0].
In stereophonic acoustic echo cancellation (SAEC) problem, fast and accurate tracking of echo path is strongly required for stable echo cancellation.
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Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com