Theorem 1 gives information on $\langle$about$\rangle$ ......
Also, wherever possible, we work with integer coefficients, enabling us to obtain information about torsion.
The main information conveyed by this formula is that ......
For background information, see [5].
This accords with the intuition that as we pass down the coding tree, we find out more and more detailed information about the ordering actually represented.
The interested reader is referred to [4] for further information. [Note the double r in referred.]
Another proof (yielding more information) can be found in [GH].
The survey article [5] by Diestel contains a wealth of information about the Dunford-Pettis property.
Intuitively, entropy of a partition is a measure of its information content—the larger the entropy, the larger the information content.
These three results lead to several illuminating pieces of information about the (insufficiently studied) Berger property in general spaces.
[Note that information has no plural and does not appear with an.]
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