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Exact(1)
Indeed, in the setting of Hilbert spaces, one can proved that for algorithm (1.2) the same convergence result as that of Theorem 1.1 holds under conditions (i - iii) above.
Similar(59)
Don't argue on and on about things no one can prove, or things that can be proved with some checking.
Similarly one can prove that h is convex on the coordinates in (Delta^{2}).
Similarly, one can prove that F is strongly monotone on (operatorname{int}(mathbb{R}_^{2})).
Moreover, one can prove that under AFA, N∞ and Tr have the properties that one would want them to have.
From these properties one can prove others.
No one can prove otherwise, of course.
No one can prove it.
But no one will talk about it, and no one can prove it," he said.
That is an unanswerable, for no one can prove what the rational expectation should have been.
There are a lot of things that no one can prove.
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Justyna Jupowicz-Kozak
CEO of Professional Science Editing for Scientists @ prosciediting.com