1
[see also: shape, structure, type, kind] The map F can be put <brought> into this form by setting......
Let S be the set of all solutions of (8) of the form (3).
We shall then show that this f can be represented in the form f=......
This implies that the local martingale must take a very specific form.
in diagonal form
2
[see also: constitute, make up] Consider the Blaschke product
formed with the zeros of f.
They form a base of the topology of X.
Theorem 2 will form the basis for our subsequent results.
The key part is to show that the submanifolds Uk fit together to form a complex submanifold.