On Weak Compactness in Biprojective Tensor Product Spaces

It is proved that a weak\* compact subset A of scalar measures on a \_-algebra is weakly compact if and only if there exists a nonnegative scalar measure \* such that each measure in A is \*-continuous (such a measure \* is called a control measure for A). This result is then used to obtain a very g

Let X, Y be two separable Banach spaces and let V/X and W/Y be finite dimensional subspaces. Suppose that V/S/X, W/Z/Y and let M # L(S, V), N # L(Z, W ). We will prove that if : is a reasonable, uniform crossnorm on X Y then Here for any Banach space X, V/S/X and M # L(S, V ) Also some application

An example of two distinguished M c h e t spaces E, F is given (even more, E is quasinormable and F is normable) such that their completed injective tensor product E&F is not distinguished. On the other hand, it is proved that for arbitrary reflexive F r k h e t space E and arbitrary compact set K t