Exact(32)
This is again immediately confirmed by the previous Corollary 2.3.
Let the conditions from the previous corollary hold.
We now state the following example explaining how to use the previous corollary.
If in the previous corollary,, and in part (b), the sequence converges to a solution.
If is a Banach space, then the previous corollary is the Theorem in [4].
It is an immediate consequence of the previous corollary where (varphi (t)=qt). quad square).
Similar(28)
We conclude with some examples in which the previous corollaries apply.
In the previous corollaries, we derived only inequalities over some subsets of.
This result alone is not surprising, but as summarized in concluding section, when combined with the two previous corollaries, it becomes highly suggestive.
We note the following interesting result which was published in a minor journal and so it was not well known in the public of univalent function theory but is strongly connected with the previous Corollaries 3.3, 3.5 and 3.6.
From the three previous corollaries we immediately deduce that (P^) is strictly ((H,G -super-stabilizable, (NS^) is strictly ((H,G -super-stabilizableble, and (T^) is strictly ((H,G -super-stabilizableble, respectively.
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