On Subspaces of b-Spaces in the Sense of Noureddine

Let EfI

## Abstract For Ω an open subset of IR^N^ and 1 < __p__ < ∞, we prove that any complemented subspace __E__ of __L__^p^~loc~ (Ω) contains either a complemented copy of (__l__^2^)^IN^ or a complemented copy of (__l__^p^)^IN^, provided ≈︁ __F__ ≈︁ and ω and ≈︁ ω⊕ __F__ with __F__ Banach space. We also

A subspace \(M \subset L\_{u}^{2}(\Delta)=A\_{2}\) is called an e-subspace if (i) \(\operatorname{dim} M0\) and \(N \geqslant 0\) are integers. For \(k=1\) this implies a sharper form of a theorem of H. Hedenmalm. I 199.3 Academic Press, Inc.

If F is the finite field of characteristic p and order q s p , let F F q be the q category whose objects are functors from finite dimensional F -vector spaces to q F -vector spaces, and with morphisms the natural transformations between such q functors. Ž . A fundamental object in F F q is the injec